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Stringy invariants and toric Artin stacks

Published online by Cambridge University Press:  07 February 2022

Matthew Satriano
Affiliation:
Department of Pure Mathematics, University of Waterloo, 200 University Avenue West, Waterloo, Ontario, N2L 3G1, Canada; E-mail: [email protected]
Jeremy Usatine
Affiliation:
Department of Mathematics, Brown University, 151 Thayer Street, Providence, RI, 02912, USA; E-mail: [email protected]

Abstract

We propose a conjectural framework for computing Gorenstein measures and stringy Hodge numbers in terms of motivic integration over arcs of smooth Artin stacks, and we verify this framework in the case of fantastacks, which are certain toric Artin stacks that provide (nonseparated) resolutions of singularities for toric varieties. Specifically, let $\mathcal {X}$ be a smooth Artin stack admitting a good moduli space $\pi : \mathcal {X} \to X$ , and assume that X is a variety with log-terminal singularities, $\pi $ induces an isomorphism over a nonempty open subset of X and the exceptional locus of $\pi $ has codimension at least $2$ . We conjecture a change-of-variables formula relating the motivic measure for $\mathcal {X}$ to the Gorenstein measure for X and functions measuring the degree to which $\pi $ is nonseparated. We also conjecture that if the stabilisers of $\mathcal {X}$ are special groups in the sense of Serre, then almost all arcs of X lift to arcs of $\mathcal {X}$ , and we explain how in this case (assuming a finiteness hypothesis satisfied by fantastacks) our conjectures imply a formula for the stringy Hodge numbers of X in terms of a certain motivic integral over the arcs of $\mathcal {X}$ . We prove these conjectures in the case where $\mathcal {X}$ is a fantastack.

Type
Algebraic and Complex Geometry
Creative Commons
Creative Common License - CCCreative Common License - BY
This is an Open Access article, distributed under the terms of the Creative Commons Attribution licence (https://creativecommons.org/licenses/by/4.0/), which permits unrestricted re-use, distribution, and reproduction in any medium, provided the original work is properly cited.
Copyright
© The Author(s), 2022. Published by Cambridge University Press

1 Introduction

Let X be a variety with log-terminal singularities. Motivated by mirror symmetry for singular Calabi–Yau varieties, Batyrev introduced stringy Hodge numbers for X in [Reference BatyrevBat98], which are defined in terms of a resolution of singularities. In particular, if X admits a crepant resolution $Y \to X$ by a smooth projective variety Y, then the stringy Hodge numbers of X are equal to the usual Hodge numbers of Y. In [Reference Denef and LoeserDL02], Denef and Loeser defined the Gorenstein measure $\mu ^{\mathrm {Gor}}_X$ on the arc scheme $\mathscr {L}(X)$ of X and used it to prove a McKay correspondence that refines the McKay correspondence conjectured by Reid in [Reference ReidRei92] and proved by Batyrev in [Reference BatyrevBat99]. The measure $\mu ^{\mathrm {Gor}}_X$ takes values in a modified Grothendieck ring of varieties $\widehat {\mathscr {M}}_k\left [\mathbb {L}^{1/m}\right ]$ and is a refinement of the stringy Hodge numbers of X. If X admits a crepant resolution $Y \to X$ , then $\mu ^{\mathrm {Gor}}_X$ is essentially equivalent to the usual motivic measure $\mu _Y$ on $\mathscr {L}(Y)$ as introduced by Kontsevich in [Reference KontsevichKon95].

A major open question asks whether or not the stringy Hodge numbers of projective varieties are nonnegative, as conjectured by Batyrev in [Reference BatyrevBat98, Conjecture 3.10]. A stronger conjecture predicts that stringy Hodge numbers of projective varieties are equal to the dimensions of some kind of cohomology groups. In [Reference YasudaYas04], these conjectures were proved in the case where X has quotient singularites. Yasuda showed that in that case, if $\mathcal {X}$ is the canonical smooth Deligne–Mumford stack over X, then the stringy Hodge numbers of X are equal to the orbifold Hodge numbers of $\mathcal {X}$ in the sense of Chen and Ruan [Reference Chen and RuanCR04]. To prove this result, Yasuda introduced a notion of motivic integration (further developed in [Reference YasudaYas06Reference YasudaYas19]) for Deligne–Mumford stacks and proved a formula expressing $\mu ^{\mathrm {Gor}}_X$ in terms of certain motivic integrals over arcs of $\mathcal {X}$ . When X is projective, those integrals over arcs of $\mathcal {X}$ compute the orbifold Hodge numbers of $\mathcal {X}$ .

In this paper, we initiate a similar program for varieties with singularities that are worse than quotient singularities. Such varieties never arise as the coarse space of a smooth Deligne–Mumford stack, so one is instead forced to consider Artin stacks. A major technicality is that such stacks are not separated. This leads us to define new functions $\operatorname {\mathrm {sep}}_{\pi , \mathcal {C}}$ , discussed later, which measure the degree to which an Artin stack is not separated. These functions play a key role in our theory.

The class of varieties we consider are those X occurring as the good moduli space (in the sense of [Reference AlperAlp13]) of a smooth Artin stack $\mathcal {X}$ ; varieties of this form arise naturally in the context of geometric invariant theory. We require that the map $\pi \colon \mathcal {X} \to X$ induce an isomorphism over a nonempty open subset of X and that the exceptional locus of $\pi $ have codimension at least $2$ . In other words, we want $\mathcal {X}$ to be a ‘small’ resolution of X. We conjecture a relationship between $\mu ^{\mathrm {Gor}}_X$ and a motivic measure $\mu _{\mathcal {X}}$ on the arc stack $\mathscr {L}(\mathcal {X})$ of $\mathcal {X}$ . This relationship involves integrating $\operatorname {\mathrm {sep}}_{\pi , \mathcal {C}}: \mathscr {L}(X) \to \mathbb {N}$ against $\mu ^{\mathrm {Gor}}_X$ . This function $\operatorname {\mathrm {sep}}_{\pi , \mathcal {C}}$ counts the number of arcs of $\mathcal {X}$ (in some auxiliary measurable subset $\mathcal {C}$ ), up to isomorphism, above each arc of X, and can therefore be thought of as an invariant which measures the nonseparatedness of $\pi $ . We emphasise that this conjectural relationship is not ‘built into’ our definition of $\mu _{\mathcal {X}}$ . In fact, our notion of $\mu _{\mathcal {X}}$ is straightforward: it is more or less Kontsevich’s original motivic measure, except that various notions for schemes are replaced with the obvious analogues for Artin stacks. When the stabilisers of $\mathcal {X}$ are special groups in the sense of SerreFootnote 1 and $\mathscr {L}(\pi ): \mathscr {L}(\mathcal {X}) \to \mathscr {L}(X)$ has finite fibres outside a set of measure $0$ , our conjectures imply a formula expressing the stringy Hodge numbers of X in terms of a certain motivic integral over $\mathscr {L}(\mathcal {X})$ .

We prove that our conjectures hold when X is a toric variety and $\mathcal {X}$ is a fantastack – that is, a type of smooth toric Artin stack in the sense of [Reference Geraschenko and SatrianoGS15aReference Geraschenko and SatrianoGS15b]. Fantastacks are a broad class of toric stacks that allow one to simultaneously have any specified toric variety X as a good moduli space while also obtaining stabilisers with arbitrarily large dimension. An important special case of fantastacks (and their products with algebraic tori) is the so-called canonical stack $\mathcal {X}$ over a toric variety X. When X has quotient singularities, $\mathcal {X}$ is the canonical smooth Deligne–Mumford stack over X; when X has worse singularities, the good moduli space of $\mathcal {X}$ is still X, but $\mathcal {X}$ is an Artin stack that is not Deligne–Mumford.

1.1 Conventions

Throughout this paper, k will be an algebraically closed field with characteristic $0$ . All Artin stacks will be assumed to have affine (geometric) stabilisers, and all toric varieties will be assumed to be normal. For any stack $\mathcal {X}$ over k, we will let $\lvert \mathcal {X}\rvert $ denote the topological space associated to $\mathcal {X}$ , and for any k-algebra R, we will let $\overline {\mathcal {X}}(R)$ denote the set of isomorphism classes of the category $\mathcal {X}(R)$ .

1.2 Conjectures

Our first conjecture predicts a relationship between $\mu ^{\mathrm {Gor}}_X$ and $\mu _{\mathcal {X}}$ . As already mentioned, our formula involves integrals weighted by functions $\operatorname {\mathrm {sep}}_{\pi , \mathcal {C}}$ that measure the degree to which $\pi $ is not separated. We refer the reader to section 3 for precise definitions of the arc stack $\mathscr {L}(\mathcal {X})$ and its motivic measure $\mu _{\mathcal {X}}$ , and to subsection 3.4 for the definition of $\operatorname {\mathrm {sep}}_{\pi , \mathcal {C}}$ and its integral $\int _C \operatorname {\mathrm {sep}}_{\pi , \mathcal {C}} \mathrm {d}\mu ^{\mathrm {Gor}}_X$ .

Conjecture 1.1. Let $\mathcal {X}$ be a smooth irreducible Artin stack over k admitting a good moduli space $\pi : \mathcal {X} \to X$ , where X is a separated k-scheme and has log-terminal singularities. Assume that $\pi $ induces an isomorphism over a nonempty open subset of X, and that the exceptional locus of $\pi $ has codimension at least $2$ .

If $\mathcal {C} \subset \lvert \mathscr {L}(\mathcal {X})\rvert $ is a measurable subset such that $\operatorname {\mathrm {sep}}_{\pi , \mathcal {C}}: \mathscr {L}(X) \to \mathbb {N} \cup \{\infty \}$ is finite outside a set of measure $0$ , then $\operatorname {\mathrm {sep}}_{\pi , \mathcal {C}}: \mathscr {L}(X) \to \mathbb {N} \cup \{\infty \}$ has measurable fibres, and for any measurable subset $C \subset \mathscr {L}(X)$ , the set $\mathcal {C} \cap \mathscr {L}(\pi )^{-1}(C) \subset \lvert \mathscr {L}(\mathcal {X})\rvert $ is measurable and satisfies

$$ \begin{align*} \mu_{\mathcal{X}}\left(\mathcal{C} \cap \mathscr{L}(\pi)^{-1}(C)\right) = \int_C \operatorname{\mathrm{sep}}_{\pi, \mathcal{C}} \mathrm{d}\mu^{\mathrm{Gor}}_X \in \widehat{\mathscr{M}}_k\left[\mathbb{L}^{1/m}\right], \end{align*} $$

where $m \in \mathbb {Z}_{>0}$ is such that $mK_X$ is Cartier.

This conjecture predicts that for the purpose of computing $\mu ^{\mathrm {Gor}}_X$ , the stack $\mathcal {X}$ behaves like a crepant resolution of X, except we need to correct by $\operatorname {\mathrm {sep}}_{\pi , \mathcal {C}}$ to account for the fact that $\mathcal {X}$ is not separated over X. Set

$$ \begin{align*} \operatorname{\mathrm{sep}}_\pi = \operatorname{\mathrm{sep}}_{\pi, \lvert\mathscr{L}(\mathcal{X})\rvert}. \end{align*} $$

Notice that Conjecture 1.1 implies, in particular, that the motivic measure $\mu _{\mathcal {X}}$ ‘does not see’ how $\mu ^{\mathrm {Gor}}_X$ behaves on the set $\operatorname {\mathrm {sep}}_\pi ^{-1}(0) \subset \mathscr {L}(X)$ . This set can have nonzero measure because $\pi : \mathcal {X} \to X$ does not necessarily satisfy the ‘strict valuative criterion’ – that is, there may exist arcs of X (even outside a set of measure $0$ ) that do not lift to arcs of $\mathcal {X}$ . Thus in general we cannot use this conjecture to compute the total Gorenstein measure $\mu ^{\mathrm {Gor}}_X(\mathscr {L}(X))$ , which specialises to the stringy Hodge numbers of X. This issue already occurs in the case where $\mathcal {X}$ is a Deligne–Mumford stack. For this reason, Yasuda uses a notion of ‘twisted arcs’ of $\mathcal {X}$ instead of usual arcs of $\mathcal {X}$ , and this is why the inertia of $\mathcal {X}$ and orbifold Hodge numbers appear in Yasuda’s setting. We take a different approach, emphasising a setting in which the next conjecture predicts that almost all arcs of X lift to arcs of $\mathcal {X}$ .

Conjecture 1.2. Let $\mathcal {X}$ be a finite-type Artin stack over k admitting a good moduli space $\pi : \mathcal {X} \to X$ . Assume that X is an irreducible k-scheme and that $\pi $ induces an isomorphism over a nonempty open subset of X. If the stabilisers of $\mathcal {X}$ are all special groups, then $\operatorname {\mathrm {sep}}_\pi ^{-1}(0) \subset \mathscr {L}(X)$ is measurable and

$$ \begin{align*} \mu_X\left( \operatorname{\mathrm{sep}}_\pi^{-1}(0) \right) = 0, \end{align*} $$

where we note that $\mu _X$ is the usual (non-Gorenstein) motivic measure on $\mathscr {L}(X)$ .

Remark 1.3. All special groups are connected, so if $\mathcal {X}$ is a Deligne–Mumford stack whose stabilisers are special groups, then its stabilisers are all trivial. Thus Conjecture 1.2 highlights a setting that is ‘orthogonal’ to the setting considered by Yasuda.

Our next question is motivated by the fact that if $\operatorname {\mathrm {sep}}_\pi $ is finite outside a set of measure $0$ , we may then consider the special case of Conjecture 1.1 where $\mathcal {C} = \lvert \mathscr {L}(\mathcal {X})\rvert $ .

Question 1.4. Let $\mathcal {X}$ be a finite-type Artin stack over k admitting a good moduli space $\pi : \mathcal {X} \to X$ . Assume that X is an irreducible k-scheme and that $\pi $ induces an isomorphism over a nonempty open subset of X. When is

$$ \begin{align*} \mu_X\left(\operatorname{\mathrm{sep}}_\pi^{-1}(\infty)\right) = 0 \end{align*} $$

satisfied?

We now give an application of this framework to computing stringy Hodge numbers. In subsection 3.4, we introduce the function $\operatorname {\mathrm {sep}}_{\mathcal {X}} = 1/(\operatorname {\mathrm {sep}}_\pi \circ \mathscr {L}(\pi )): \lvert \mathscr {L}(\mathcal {X})\rvert \to \mathbb {Q}_{\geq 0} \cup \{\infty \}$ . We think of its integral $\int _{\mathscr {L}(\mathcal {X})} \operatorname {\mathrm {sep}}_{\mathcal {X}} \mathrm {d}\mu _{\mathcal {X}}$ as a kind of motivic class of $\mathscr {L}(\mathcal {X})$ corrected by $\operatorname {\mathrm {sep}}_{\mathcal {X}}$ to account for the fact that $\mathcal {X}$ is not separated. We refer the reader to subsection 3.4 for the precise definitions of $\int _{\mathscr {L}(\mathcal {X})} \operatorname {\mathrm {sep}}_{\mathcal {X}} \mathrm {d}\mu _{\mathcal {X}}$ and the ring $\widehat {\mathscr {M}_k \otimes _{\mathbb {Z}} \mathbb {Q}}$ . The next proposition is then immediate:

Proposition 1.5. With hypotheses as in Conjecture 1.1, if the stablisers of $\mathcal {X}$ are special groups and $\mu _X\left (\operatorname {\mathrm {sep}}_\pi ^{-1}(\infty )\right ) = 0$ , then Conjecture 1.1 and Conjecture 1.2 imply that the fibres of $\operatorname {\mathrm {sep}}_{\mathcal {X}}: \lvert \mathscr {L}(\mathcal {X})\rvert \to \mathbb {Q}_{\geq 0}$ are measurable and

$$ \begin{align*} \mu^{\mathrm{Gor}}_X(\mathscr{L}(X)) = \int_{\mathscr{L}(\mathcal{X})} \operatorname{\mathrm{sep}}_{\mathcal{X}} \mathrm{d}\mu_{\mathcal{X}} \in \widehat{\mathscr{M}_k \otimes_{\mathbb{Z}} \mathbb{Q}}. \end{align*} $$

Since the stringy Hodge–Deligne invariant of X is a specialisation of the image of $\mu ^{\mathrm {Gor}}_X(\mathscr {L}(X))$ in $\left (\widehat {\mathscr {M}_k \otimes _{\mathbb {Z}} \mathbb {Q}}\right )\left [\mathbb {L}^{1/m}\right ] \supset \widehat {\mathscr {M}_k \otimes _{\mathbb {Z}} \mathbb {Q}}$ , Proposition 1.5 provides a conjectural formula for the stringy Hodge numbers of X (when the stringy Hodge numbers exist – that is, when the stringy Hodge–Deligne invariant is a polynomial).

We envision a few potential applications of this framework. Noting that the good moduli space map $\pi : \mathcal {X} \to X$ is intrinsic to the stack $\mathcal {X}$ and therefore so is the integral $\int _{\mathscr {L}(\mathcal {X})} \operatorname {\mathrm {sep}}_{\mathcal {X}} \mathrm {d}\mu _{\mathcal {X}}$ , we hope that a cohomological interpretation of $\int _{\mathscr {L}(\mathcal {X})} \operatorname {\mathrm {sep}}_{\mathcal {X}} \mathrm {d}\mu _{\mathcal {X}}$ will lead to progress on Batyrev’s conjecture on the nonnegativity of stringy Hodge numbers. We also hope that by considering Proposition 1.5 as a kind of McKay correspondence, our conjectures will lead to new representation-theoretic statements for positive-dimensional algebraic groups.

Remark 1.6. The hypothesis $\mu _X\left (\operatorname {\mathrm {sep}}_\pi ^{-1}(\infty )\right ) = 0$ in Proposition 1.5 allows us to make a canonical choice for $\mathcal {C}$ in Conjecture 1.1, specifically the choice $\mathcal {C} = \lvert \mathscr {L}(\mathcal {X})\rvert $ . We hope that even when this hypothesis does not hold, one can still (after an appropriate generalisation of the notion of an arc) make a canonical choice for $\mathcal {C}$ . This is a subject of our ongoing research.

1.3 Main results

Our first main result is that Conjecture 1.1 holds, and $\mu _X\left (\operatorname {\mathrm {sep}}_\pi ^{-1}(\infty )\right ) = 0$ , when $\mathcal {X}$ is a fantastack and $\mathcal {C} = \lvert \mathscr {L}(\mathcal {X})\rvert $ . In particular, our framework applies to the Gorenstein measure of any toric variety X with log-terminal singularities.

Theorem 1.7. Conjecture 1.1 holds and $\mu _X\left (\operatorname {\mathrm {sep}}_\pi ^{-1}(\infty )\right ) = 0$ when $\mathcal {X}$ is a fantastack and $\mathcal {C} = \lvert \mathscr {L}(\mathcal {X})\rvert $ .

Remark 1.8. In fact, our techniques prove a more general result: the conclusions of Conjecture 1.1 hold when $\mathcal {C} = \lvert \mathscr {L}(\mathcal {X})\rvert $ and $\mathcal {X}$ is a fantastack satisfying a certain combinatorial condition analogous to $\mathcal {X} \to X$ being ‘crepant’ (see Remark 2.20 for more details). It is important to note here that unlike the case of Deligne–Mumford stacks, defining $K_{\mathcal {X}}$ for Artin stacks is a subtle issue, so there is no a priori obvious definition one can take for $\mathcal {X}\to X$ to be crepant.

Remark 1.9. We note that the stacks $\mathcal {X}$ in Theorem 1.7 all have commutative stabilisers. In order to provide evidence that Conjecture 1.1 should not be limited to the setting of commutative stabilisers, we also verify that it holds in examples that involve $\mathrm {SL}_2$ as a stabiliser (see section 10). These examples also demonstrate the flexibility in choosing the auxiliary set $\mathcal {C} \subset \lvert \mathscr {L}(\mathcal {X})\rvert $ .

Remark 1.10. Theorem 1.7 can be thought of as a motivic change-of-variables formula. We note that Balwe introduced versions of motivic integration for Artin n-stacks [Reference BalweBal08Reference BalweBal15] and proved a change-of-variables formula [Reference BalweBal08, Theorem 7.2.5]. However, Theorem 1.7 cannot be obtained from Balwe’s result, as the map $\pi : \mathcal {X} \to X$ does not satisfy Balwe’s hypotheses: specifically, $\pi $ is not ‘ $0$ -truncated’.

The three main steps of proving Theorem 1.7 are as follows. First, we give a combinatorial description of the fibres of the map $\mathscr {L}(\pi ): \mathscr {L}(\mathcal {X}) \to \mathscr {L}(X)$ . Second, we show that for sufficiently large n, the map of jets $\mathscr {L}_n(\pi ): \mathscr {L}_n(\mathcal {X}) \to \mathscr {L}_n(X)$ has constant fibres (after taking the fibres’ reduced structure) over certain combinatorially defined pieces of $\mathscr {L}_n(X)$ . These two steps allow us to reduce Theorem 1.7 to the final step: verifying the case where the measurable sets C are certain combinatorially defined subsets of $\mathscr {L}(X)$ . A key ingredient in this final step is Theorem 3.9 and its corollary, Corollary 3.16, which show how to compute the motivic measure of the stack quotient of a variety by the action of a special group.

Our second main result is that Conjecture 1.2 holds for fantastacks.

Theorem 1.11. Conjecture 1.2 holds when $\mathcal {X}$ is a fantastack.

An essential ingredient in proving Theorem 1.11 is Theorem 9.1, which may be of independent interest, as it provides a combinatorial criterion to check whether or not the stabilisers of a fantastack are special groups.

2 Preliminaries

In this section, we introduce notation and recall some facts about motivic integration for schemes and the Gorenstein measure, the Grothendieck ring of stacks and constructible subsets and toric Artin stacks.

2.1 Motivic integration for schemes

If X is a k-scheme, for each $n \in \mathbb {N}$ we will let $\mathscr {L}_n(X)$ denote the nth jet scheme of X; for each $n \geq m$ we will let $\theta ^n_m: \mathscr {L}_n(X) \to \mathscr {L}_m(X)$ denote the truncation morphism; we will let $\mathscr {L}(X) = \varprojlim _n\mathscr {L}_n(X)$ denote the arc scheme of X; and for each $n \in \mathbb {N}$ we will let $\theta _n: \mathscr {L}(X) \to \mathscr {L}_n(X)$ denote the canonical morphism, which is also referred to as a truncation morphism. For any k-algebra R and k-scheme X, the map is bijective by [Reference BhattBha16, Theorem 1.1], and we will often implicitly make this identification.

We will let $K_0(\mathbf {Var}_k)$ denote the Grothendieck ring of finite type k-schemes; for each finite-type k-scheme X we will let $\mathrm {e}(X) \in K_0(\mathbf {Var}_k)$ denote its class; we will let $\mathbb {L} = \mathrm {e}\left (\mathbb {A}_k^1\right ) \in K_0(\mathbf {Var}_k)$ denote the class of the affine line; and for each constructible subset C of a finite-type k-scheme we will let $\mathrm {e}(C) \in K_0(\mathbf {Var}_k)$ denote its class.

We will let $\mathscr {M}_k$ denote the ring obtained by inverting $\mathbb {L}$ in $K_0(\mathbf {Var}_k)$ . For each $\Theta \in \mathscr {M}_k$ , let $\dim (\Theta ) \in \mathbb {Z} \cup \{-\infty \}$ denote the infimum over all $d \in \mathbb {Z}$ such that $\Theta $ is in the subgroup of $\mathscr {M}_k$ generated by elements of the form $\mathrm {e}(X)\mathbb {L}^{-n}$ with $\dim (X) - n \leq d$ , and let $\lVert \Theta \rVert = \exp (\dim (\Theta ))$ . We will let $\widehat {\mathscr {M}}_k$ denote the separated completion of $\mathscr {M}_k$ with respect to the non-Archimedean seminorm $\lVert \cdot \rVert $ , and we will also let $\lVert \cdot \rVert $ denote the non-Archimedean norm on $\widehat {\mathscr {M}}_k$ . For any $m \in \mathbb {Z}_{>0}$ , we will let $\widehat {\mathscr {M}}_k\left [\mathbb {L}^{1/m}\right ] = \widehat {\mathscr {M}}_k[t]/(t^m-\mathbb {L})$ , we will let $\mathbb {L}^{1/m}$ denote the image of t in $\widehat {\mathscr {M}}_k\left [\mathbb {L}^{1/m}\right ]$ and we will endow $\widehat {\mathscr {M}}_k\left [\mathbb {L}^{1/m}\right ]$ with the topology induced by the equality

$$ \begin{align*} \widehat{\mathscr{M}}_k\left[\mathbb{L}^{1/m}\right] = \bigoplus_{\ell = 0}^{m-1} \widehat{\mathscr{M}}_k \cdot \left(\mathbb{L}^{1/m}\right)^\ell, \end{align*} $$

where each summand $\widehat {\mathscr {M}}_k \cdot \left (\mathbb {L}^{1/m}\right )^\ell $ has the topology induced by the bijection

$$ \begin{align*} \widehat{\mathscr{M}}_k \to \widehat{\mathscr{M}}_k \cdot \left(\mathbb{L}^{1/m}\right)^\ell: \Theta \mapsto \Theta \cdot \left(\mathbb{L}^{1/m}\right)^\ell. \end{align*} $$

We note that in the foregoing and throughout this paper, if $\Theta $ is an element of $K_0(\mathbf {Var}_k)$ , $\mathscr {M}_k$ or $\widehat {\mathscr {M}}_k$ , we slightly abuse notation by also using $\Theta $ to refer to its image under any of the ring maps $K_0(\mathbf {Var}_k) \to \mathscr {M}_k \to \widehat {\mathscr {M}}_k \to \widehat {\mathscr {M}}_k\left [\mathbb {L}^{1/m}\right ]$ .

If X is an equidimensional finite-type k-scheme and $C \subset \mathscr {L}(X)$ is a cylinder – that is, $C =(\theta _n)^{-1}(C_n)$ for some $n \in \mathbb {N}$ and some constructible subset $C_n \subset \mathscr {L}_n(X)$ – we will let $\mu _X(C) \in \widehat {\mathscr {M}}_k$ denote the motivic measure of C, so by definition

$$ \begin{align*} \mu_X(C) = \lim_{n \to \infty} \mathrm{e}(\theta_n(C))\mathbb{L}^{-(n+1)\dim X} \in \widehat{\mathscr{M}}_k, \end{align*} $$

where we note that each $\theta _n(C)$ is constructible (for example, by [Reference Chambert-Loir, Nicaise and SebagCLNS18, Chapter 5, Corollary 1.5.7(b)]) and this limit exists (for example, by [Reference Chambert-Loir, Nicaise and SebagCLNS18, Chapter 6, Theorem 2.5.1]). The motivic measure $\mu _X$ can be extended to the class of so-called measurable subsets of $\mathscr {L}(X)$ , whose definition we now recall.

Definition 2.1. Let X be an equidimensional finite-type scheme over k, set $C \subset \mathscr {L}(X)$ and $\varepsilon \in \mathbb {R}_{>0}$ , let I be a set, let $C^{(0)} \subset \mathscr {L}(X)$ be a cylinder and let $\left \{C^{(i)}\right \}_{i \in I}$ be a collection of cylinders in $\mathscr {L}(X)$ .

The data $\left (C^{(0)}, \left (C^{i}\right )_{i \in I}\right )$ is called a cylindrical $\varepsilon $ -approximation of C if

$$ \begin{align*} \left(C \cup C^{(0)}\right) \setminus \left(C \cap C^{(0)}\right) \subset \bigcup_{i \in I} C^{(i)} \end{align*} $$

and, for all $i \in I$ ,

$$ \begin{align*} \left\lVert \mu_X\left(C^{(i)}\right) \right\rVert < \varepsilon. \end{align*} $$

Definition 2.2. Let X be an equidimensional finite-type scheme over k, and set $C \subset \mathscr {L}(X)$ . The set C is called measurable if for any $\varepsilon \in \mathbb {R}_{>0}$ there exists a cylindrical $\varepsilon $ -approximation of C. The motivic measure of a measurable subset $C \subset \mathscr {L}(X)$ is defined to be the unique element $\mu _X(C) \in \widehat {\mathscr {M}}_k$ such that for any $\varepsilon \in \mathbb {R}_{>0}$ and any cylindrical $\varepsilon $ -approximation $\left (C^{(0)}, \left (C^{(i)}\right )_{i \in I}\right )$ of C, we have

$$ \begin{align*} \left\lVert \mu_X(C) - \mu_X\left(C^{(0)}\right) \right\rVert < \varepsilon. \end{align*} $$

Such an element $\mu _X(C)$ exists by [Reference Chambert-Loir, Nicaise and SebagCLNS18, Chapter 6, Theorem 3.3.2].

For the remainder of this subsection, let X be an integral finite-type separated k-scheme with log-terminal singularities. We will set notation relevant for the Gorenstein measure associated to X. We will let $K_X$ denote the canonical divisor on X. If $m \in \mathbb {Z}_{>0}$ is such that $mK_X$ is Cartier, we will let $\omega _{X,m} = \iota _*\left ( \left (\Omega _{X_{\mathrm {sm}}}^{\dim X}\right )^{\otimes m} \right )$ , where $\iota : X_{\mathrm {sm}} \hookrightarrow X$ is the inclusion of the smooth locus of X, and we will let $\mathscr {J}_{X,m}$ denote the unique ideal sheaf on X such that the image of $\left (\Omega _X^{\dim X}\right )^{\otimes m} \to \omega _{X,m}$ is equal to $\mathscr {J}_{X,m} \omega _{X,m}$ . If $C \subset \mathscr {L}(X)$ is measurable, we will let $\mu ^{\mathrm {Gor}}_X(C)$ denote the Gorenstein measure of C, so by definition,

$$ \begin{align*} \mu^{\mathrm{Gor}}_X(C) &= \int_C \left(\mathbb{L}^{1/m}\right)^{\operatorname{\mathrm{ord}}_{\mathscr{J}_{X,m}}} \mathrm{d} \mu_X \\ &= \sum_{n = 0}^\infty \left(\mathbb{L}^{1/m}\right)^n \mu_X\left(\operatorname{\mathrm{ord}}_{\mathscr{J}_{X,m}}^{-1}(n) \cap C\right) \in \widehat{\mathscr{M}}_k\left[\mathbb{L}^{1/m}\right], \end{align*} $$

where $m \in \mathbb {Z}_{>0}$ is such that $mK_X$ is Cartier and $\operatorname {\mathrm {ord}}_{\mathscr {J}_{X,m}}: \mathscr {L}(X) \to \mathbb {N} \cup \{\infty \}$ is the order function of the ideal sheaf $\mathscr {J}_{X,m}$ . The following proposition is easy to check using the definition of $\mu ^{\mathrm {Gor}}_X$ and standard properties of $\mu _X$ given in [Reference Chambert-Loir, Nicaise and SebagCLNS18, Chapter 6, Proposition 3.4.3]:

Proposition 2.3. Let $\left \{C^{(i)}\right \}_{i \in \mathbb {N}}$ be a sequence of pairwise disjoint measurable subsets of $\mathscr {L}(X)$ such that $C = \bigcup _{i = 0}^\infty C^{(i)}$ is measurable. Then

$$ \begin{align*} \lim_{i \to \infty} \mu^{\mathrm{Gor}}_X\left(C^{(i)}\right) = 0, \end{align*} $$

and

$$ \begin{align*} \mu^{\mathrm{Gor}}_X(C) = \sum_{i =0}^\infty \mu^{\mathrm{Gor}}_X\left(C^{(i)}\right). \end{align*} $$

2.2 The Grothendieck ring of stacks and constructible subsets

We will let $K_0(\mathbf {Stack}_k)$ denote the Grothendieck ring of stacks in the sense of [Reference EkedahlEke09], and for each finite-type Artin stack $\mathcal {X}$ over k, we will let $\mathrm {e}(\mathcal {X}) \in K_0(\mathbf {Stack}_k)$ denote the class of $\mathcal {X}$ . If $K_0(\mathbf {Var}_k)\left [\mathbb {L}^{-1}, \left \{(\mathbb {L}^n - 1)^{-1}\right \}_{n \in \mathbb {Z}_{>0}}\right ]$ is the ring obtained from $K_0(\mathbf {Var}_k)$ by inverting $\mathbb {L}$ and $(\mathbb {L}^n-1)$ for all $n \in \mathbb {Z}_{>0}$ , then the obvious ring map $K_0(\mathbf {Var}_k) \to K_0(\mathbf {Stack}_k)$ induces an isomorphism

$$ \begin{align*} K_0(\mathbf{Var}_k)\left[\mathbb{L}^{-1}, \left\{(\mathbb{L}^n - 1)^{-1}\right\}_{n \in \mathbb{Z}_{>0}}\right] \cong K_0(\mathbf{Stack}_k), \end{align*} $$

by [Reference EkedahlEke09, Theorem 1.2]. Therefore there exists a unique ring map

$$ \begin{align*} K_0(\mathbf{Stack}_k) \to \widehat{\mathscr{M}}_k, \end{align*} $$

whose composition with $K_0(\mathbf {Var}_k) \to K_0(\mathbf {Stack}_k)$ is the usual map $K_0(\mathbf {Var}_k) \to \widehat {\mathscr {M}}_k$ . If $\Theta \in K_0 (\mathbf {Stack}_k)$ , we will slightly abuse notation by also using $\Theta $ to refer to its image under $K_0(\mathbf {Stack}_k) \to \widehat {\mathscr {M}}_k$ . By [Reference EkedahlEke09, Propositions 1.1(iii) and 1.4(i)], if G is a special group over k, then $\mathrm {e}(G) \in K_0(\mathbf {Stack}_k)$ is a unit, and for any finite-type k-scheme X with G-action, the class of the stack quotient is

$$ \begin{align*} \mathrm{e}([X/G]) = \mathrm{e}(X)\mathrm{e}(G)^{-1} \in K_0(\mathbf{Stack}_k). \end{align*} $$

Remark 2.4. Let G be an algebraic group over k. For each $n \in \mathbb {N}$ , we give $\mathscr {L}_n(G)$ the group structure induced by applying the functor $\mathscr {L}_n$ to the group law $G \times _k G \to G$ . It is easy to verify that for each $n \in \mathbb {N}$ , we have a short exact sequence

$$ \begin{align*} 1 \to \mathfrak{g} \to \mathscr{L}_{n+1}(G) \xrightarrow{\theta^{n+1}_n} \mathscr{L}_n(G) \to 1, \end{align*} $$

where $\mathfrak {g}$ is the Lie algebra of G. Thus by induction on n, the fact that $\mathbb {G}_a$ is special, the fact that extensions of special groups are special and the fact that $\mathscr {L}_0(G) \cong G$ , we see that if G is a special group, then each jet scheme $\mathscr {L}_n(G)$ is a special group.

To state the next result, we recall that if $\mathcal {X}$ is a finite-type Artin stack over k, then the topological space $\lvert \mathcal {X}\rvert $ is Noetherian, so its constructible subsets are precisely those subsets that can be written as a finite union of locally closed subsets.

Proposition 2.5. Let $\mathcal {X}$ be a finite-type Artin stack over k and let $\mathcal {C} \subset \lvert \mathcal {X}\rvert $ be a constructible subset. Then there exists a unique $\mathrm {e}(\mathcal {C}) \in K_0(\mathbf {Stack}_k)$ that satisfies the following property. If $\{\mathcal {X}_i\}_{i \in I}$ is a finite collection of locally closed substacks $\mathcal {X}_i$ of $\mathcal {X}$ such that $\mathcal {C}$ is equal to the disjoint union of the $\lvert \mathcal {X}_i\rvert $ , then

$$ \begin{align*} \mathrm{e}(\mathcal{C}) = \sum_{i \in I}\mathrm{e}(\mathcal{X}_i) \in K_0(\mathbf{Stack}_k). \end{align*} $$

Proof. The proposition holds by the exact same proof used for the analogous statement for schemes in [Reference Chambert-Loir, Nicaise and SebagCLNS18, Chapter 2, Corollary 1.3.5].

If $\mathcal {X}$ is a finite-type Artin stack and $\mathcal {C} \subset \lvert \mathcal {X}\rvert $ is a constructible subset, we will let $\mathrm {e}(\mathcal {C})$ denote the class of $\mathcal {C}$ – that is, $\mathrm {e}(\mathcal {C})$ is as in the statement of Proposition 2.5.

We end this subsection with a useful tool to compute the class of a stack.

Definition 2.6. Let S be a scheme, let Z be scheme over S, let $\mathcal {Y}$ and $\mathcal {F}$ be Artin stacks over S and let $\xi : \mathcal {Y} \to Z$ be a morphism over S. We say $\xi $ is a piecewise trivial fibration with fibre $\mathcal {F}$ if there exists a finite cover $\{Z_i\}_{i \in I}$ of Z consisting of pairwise disjoint locally closed subschemes $Z_i \subset Z$ such that for all $i \in I$ ,

$$ \begin{align*} (\mathcal{Y} \times_Z Z_i)_{\mathrm{red}} \cong (\mathcal{F} \times_S Z_i)_{\mathrm{red}} \end{align*} $$

as stacks over $(Z_i)_{\mathrm {red}}$ .

Remark 2.7. Let Z be a finite-type scheme over k, let $\mathcal {Y}$ and $\mathcal {F}$ be finite-type Artin stacks over k and let $\xi : \mathcal {Y} \to Z$ be a piecewise trivial fibration with fibre $\mathcal {F}$ . Then by Proposition 2.5,

$$ \begin{align*} \mathrm{e}(\mathcal{Y}) = \mathrm{e}(\mathcal{F})\mathrm{e}(Z) \in K_0(\mathbf{Stack}_k). \end{align*} $$

The next proposition is well known in the case where $\mathcal {Y}$ is a scheme.

Proposition 2.8. Let S be a Noetherian scheme, let Z be a finite-type scheme over S, let $\mathcal {Y}$ and $\mathcal {F}$ be finite-type Artin stacks over S and let $\xi : \mathcal {Y} \to Z$ be a morphism over S. Then $\xi $ is a piecewise trivial fibration with fibre $\mathcal {F}$ if and only if for all $z \in Z$ , there exists an isomorphism

$$ \begin{align*} (\mathcal{Y} \times_Z \operatorname{\mathrm{Spec}}(k(z)))_{\mathrm{red}} \cong (\mathcal{F} \times_S \operatorname{\mathrm{Spec}}(k(z)))_{\mathrm{red}} \end{align*} $$

of stacks over $k(z)$ , where $k(z)$ denotes the residue field of z.

Proof. If $\xi $ is a piecewise trivial fibration with fibre $\mathcal {F}$ , then for every $z\in Z$ , there is a locally closed subset $Z'\subseteq Z$ containing z for which $(\mathcal {Y}\times _Z Z')_{\mathrm {red}}\cong (\mathcal {F}\times _S Z')_{\mathrm {red}}$ as $Z^{\prime }_{\mathrm {red}}$ -stacks. Then

$$ \begin{align*} \begin{split} (\mathcal{Y}\times_Z \operatorname{\mathrm{Spec}} k(z))_{\mathrm{red}} &=\left((\mathcal{Y}\times_Z Z')_{\mathrm{red}}\times_{Z^{\prime}_{\mathrm{red}}} \operatorname{\mathrm{Spec}} k(z)\right)_{\mathrm{red}}\\ &\cong\left((\mathcal{F}\times_S Z')_{\mathrm{red}}\times_{Z^{\prime}_{\mathrm{red}}} \operatorname{\mathrm{Spec}} k(z)\right)_{\mathrm{red}}=(\mathcal{F}\times_S \operatorname{\mathrm{Spec}} k(z))_{\mathrm{red}}. \end{split} \end{align*} $$

We now show that the converse holds. Since

$$ \begin{align*} (\mathcal{Y}_{\mathrm{red}}\times_Z \operatorname{\mathrm{Spec}} k(z))_{\mathrm{red}}=(\mathcal{Y}\times_Z \operatorname{\mathrm{Spec}} k(z))_{\mathrm{red}} \end{align*} $$

for every $z\in Z$ , we can assume $\mathcal {Y}$ is reduced. By Noetherian induction on Z, we need only find a nonempty open subset $U\subseteq Z$ for which $(\mathcal {Y}\times _Z U)_{\mathrm {red}}\cong (\mathcal {F}\times _S U)_{\mathrm {red}}$ . Let $z\in Z$ be the generic point of an irreducible component of Z; replacing Z by an open affine neighbourhood of z, we may further assume Z is affine. Since $\mathcal {O}_{Z,z}$ is a field, $\mathcal {Y}\times _Z \operatorname {\mathrm {Spec}} k(z)$ is reduced and we hence have a surjective closed immersion

$$ \begin{align*} \iota\colon\mathcal{Y}\times_Z \operatorname{\mathrm{Spec}} k(z)\cong(\mathcal{F}\times_S \operatorname{\mathrm{Spec}} k(z))_{\mathrm{red}}\to\mathcal{F}\times_S \operatorname{\mathrm{Spec}} k(z). \end{align*} $$

Now, $\operatorname {\mathrm {Spec}}\mathcal {O}_{Z,z}=\lim _\lambda U_\lambda $ is the inverse limit of open affine neighbourhoods $U_\lambda \subseteq Z$ of z. Since Z is affine, each map $U_\lambda \to Z$ is affine. Note also that $\mathcal {Y}$ is Noetherian, hence quasicompact and quasiseparated, and that $\mathcal {F}\times _S \operatorname {\mathrm {Spec}} k(z)\to \operatorname {\mathrm {Spec}} k(z)$ is locally of finite presentation. [Reference RydhRyd15, Proposition B.2] then shows there is some index $\lambda $ and a morphism $\iota _\lambda \colon \mathcal {Y}\times _Z U_\lambda \to \mathcal {F}\times _S U_\lambda $ whose base change to $\operatorname {\mathrm {Spec}}\mathcal {O}_{Z,z}$ is $\iota $ . Furthermore, since $\mathcal {F}\times _S \operatorname {\mathrm {Spec}} k(z)\to \operatorname {\mathrm {Spec}} k(z)$ and $\xi $ are both of finite presentation, [Reference RydhRyd15, Proposition B.3] shows that after replacing $\lambda $ by a larger index if necessary, we can assume $\iota _\lambda $ is a surjective closed immersion, and hence defines an isomorphism $(\mathcal {Y}\times _Z U_\lambda )_{\mathrm {red}}\cong (\mathcal {F}\times _S U_\lambda )_{\mathrm {red}}$ .

2.3 Toric Artin stacks

In this subsection, we briefly review the theory of toric stacks introduced in [Reference Geraschenko and SatrianoGS15a], as well as establish some notation. Since the focus in our paper is on the toric variety X, and the toric stack $\mathcal {X}$ is viewed as a stacky resolution of X, we introduce some notational changes to emphasise this focus.

Definition 2.9. A stacky fan is a pair $\left (\widetilde {\Sigma },\nu \right )$ , where $\widetilde {\Sigma }$ is a fan on a lattice $\widetilde {N}$ and $\nu \colon \widetilde {N}\to N$ is a homomorphism to a lattice N so that the cokernel $\operatorname {\mathrm {cok}}\nu $ is finite.

A stacky fan $\left (\widetilde {\Sigma },\nu \right )$ gives rise to a toric stack as follows. Let $X_{\widetilde \Sigma }$ be the toric variety associated to $\widetilde {\Sigma }$ . Since $\operatorname {\mathrm {cok}}\nu $ is finite, $\nu ^*$ is injective, so we obtain a surjective homomorphism of tori

$$ \begin{align*} \widetilde{T}:=\operatorname{\mathrm{Spec}} k\left[\widetilde{N}^*\right]\longrightarrow\operatorname{\mathrm{Spec}} k[N^*]=:T. \end{align*} $$

Let $G_\nu $ denote the kernel of this map. Since $\widetilde {T}$ is the torus of $X_{\widetilde \Sigma }$ , we obtain a $G_\nu $ -action on $X_{\widetilde \Sigma }$ via the inclusion $G_\nu \subset \widetilde {T}$ .

Definition 2.10. With notation as in the previous paragraph, if $\left (\widetilde {\Sigma },\nu \right )$ is a stacky fan, the associated toric stack is defined to be

$$ \begin{align*} \mathcal{X}_{\widetilde{\Sigma},\nu}:=\left[X_{\widetilde{\Sigma}}/G_\nu\right]. \end{align*} $$

When $\widetilde {\Sigma }$ is the fan generated by the faces of a single cone $\widetilde {\sigma }$ , we denote $\mathcal {X}_{\widetilde {\Sigma },\nu }$ by $\mathcal {X}_{\widetilde {\sigma },\nu }$ .

Example 2.11. If $\Sigma $ is a fan on a lattice N and we let $\nu $ be the identity map, then $\mathcal {X}_{\Sigma ,\nu }=X_\Sigma $ . Thus, every toric variety is an example of a toric stack.

In this paper, we concentrate in particular on fantastacks introduced in [Reference Geraschenko and SatrianoGS15a, Section 4]. These play a particularly important role for us because they allow us to start with a toric variety $X_\Sigma $ and produce a smooth stack $\mathcal {X}$ with arbitrary degree of stackyness while maintaining the property that X is the good moduli space of $\mathcal {X}$ . In the following, we let $e_1,\dotsc ,e_r$ be the standard basis for $\mathbb {Z}^r$ .

Definition 2.12. Let $\Sigma $ be a fan on a lattice N, and let $\nu \colon \mathbb {Z}^r\to N$ be a homomorphism with finite cokernel so that every ray of $\Sigma $ contains some $v_i:=\nu (e_i)$ and every $v_i$ lies in the support of $\Sigma $ . For a cone $\sigma \in \Sigma $ , let $\widetilde \sigma =\mathrm {cone}(\{e_i\mid v_i\in \sigma \})$ . We define the fan $\widetilde \Sigma $ on $\mathbb {Z}^r$ as the fan generated by all the $\widetilde \sigma $ . We define

$$ \begin{align*} \mathcal{F}_{\Sigma,\nu} := \mathcal{X}_{\widetilde\Sigma,\nu}. \end{align*} $$

Any toric stack isomorphic to some $\mathcal {F}_{\Sigma ,\nu }$ is called a fantastack. When $\Sigma $ is the fan generated by the faces of a cone $\sigma $ , we denote $\mathcal {F}_{\Sigma ,\nu }$ by $\mathcal {F}_{\sigma ,\nu }$ .

Remark 2.13. By [Reference Geraschenko and SatrianoGS15a, Example 6.24] (compare [Reference SatrianoSat13, Theorem 5.5]), the natural map

$$ \begin{align*} \mathcal{F}_{\Sigma,\nu}\longrightarrow X_\Sigma \end{align*} $$

is a good moduli space morphism. Furthermore, fantastacks have moduli interpretations in terms of line bundles and sections, analogous to the moduli interpretation for $\mathbb {P}^n$ [Reference Geraschenko and SatrianoGS15a, Section 7].

The next two results will be useful later on.

Proposition 2.14. Let $\sigma $ be a pointed full-dimensional cone and suppose that the good moduli space map $\pi \colon \mathcal {F}_{\sigma ,\nu }\to X_\sigma $ is an isomorphism over the torus T of $X_\sigma $ . Then for any $f \in F:=\widetilde {\sigma }^\vee \cap \widetilde {N}^*$ , there exists some $f' \in F$ such that

$$ \begin{align*} f + f' \in P:=\sigma^\vee\cap N^*. \end{align*} $$

In particular, if $\psi \colon F\to \mathbb {N}\cup \{\infty \}$ is a morphism of monoids and $\psi (P)\subset \mathbb {N}$ , then $\psi (F)\subset \mathbb {N}$ .

Proof. Let $v_i=\beta (e_i)$ for $1\leq i\leq r$ . Since $\pi $ is an isomorphism over T, each $v_i\neq 0$ . As $\sigma $ is pointed, there exists some $p \in P$ such that $\langle v_i, p \rangle> 0$ for all i. Viewing p as an element of F via the inclusion $P\subset F$ , we have $\langle e_i, p \rangle> 0$ .

Let $f_1, \dotsc , f_r$ be the basis of $\widetilde {M}$ dual to $e_1, \dotsc , e_r$ . Since the $f_i$ are generators of F, it suffices to prove the proposition for each $f_i$ . Note that

$$ \begin{align*} \langle e_1, p \rangle f_1 + \dotsb + \langle e_r, p \rangle f_r = p \in P. \end{align*} $$

Since $\langle e_i, p \rangle> 0$ , we see that

$$ \begin{align*} f^{\prime}_i:=(\langle e_i,p\rangle-1)f_i+\sum_{j\neq i}\left\langle e_j,p\right\rangle f_j\in F \end{align*} $$

and that $f_i+f^{\prime }_i\in P$ .

Proposition 2.15. Keep the notation and hypotheses of Proposition 2.14 and let $\beta \colon \widetilde \sigma \cap \widetilde {N}\to \sigma \cap N$ be the induced map. If $w \in \sigma \cap N$ , then $\beta ^{-1}(w)$ is a finite set.

Proof. Let $f_1, \dotsc , f_r$ be the minimal generators of the monoid F. By Proposition 2.14, there exist $f^{\prime }_1, \dotsc , f^{\prime }_r$ such that $f_i + f^{\prime }_i \in P$ for all $i \in \{1, \dotsc , r\}$ . For any $\widetilde {w} \in \beta ^{-1}(w)$ ,

$$ \begin{align*} \left\langle \widetilde{w}, f_i \right\rangle \leq \left\langle \widetilde{w}, f_i + f^{\prime}_i \right\rangle = \left\langle w, f_i+f^{\prime}_i\right\rangle, \end{align*} $$

so there are only finitely many possible values for each $\left \langle \widetilde {w}, f_i \right \rangle $ . Thus $\beta ^{-1}(w)$ is a finite set.

We end this section by discussing canonical stacks as defined in [Reference Geraschenko and SatrianoGS15a, Section 5].

Definition 2.16. If $\Sigma $ is a fan on a lattice N, let $v_1,\dotsc ,v_r\in N$ be the first lattice points on the rays of $\Sigma $ , let $\nu \colon \mathbb {Z}^r\to N$ be the map $\nu (e_i):=v_i$ and let $\widetilde \Sigma $ be as in Definition 2.12. If $N'$ is a direct complement of the support of $\Sigma $ and $\nu '\colon \mathbb {Z}^r\oplus N'\to N$ is given by $\nu '(v,n')=\nu (v)+n'$ , then $\mathcal {X}_{\widetilde \Sigma ,\nu '}$ is the canonical stack of $X_\Sigma $ .

Remark 2.17. With notation as in Definition 2.16, if the support of $\Sigma $ is N, the canonical stack of $X_\Sigma $ is the fantastack $\mathcal {F}_{\widetilde {\Sigma },\nu }$ .

The next proposition, which is straightforward from the definition, says that canonical stacks are compatible with open immersions. This will be useful for us, as this proposition will allow us to reduce most of our work to the case of affine toric varieties defined by a d-dimensional cone in $N_{\mathbb {R}}$ .

Proposition 2.18. Let $\Sigma $ be a fan consisting of pointed rational cones in $N_{\mathbb {R}}$ , let $\sigma $ be a cone in $\Sigma $ , let $X(\Sigma )$ and $X(\sigma )$ be the T-toric varieties associated to $\Sigma $ and $\sigma $ , respectively, and let $\iota : X(\sigma ) \hookrightarrow X(\Sigma )$ be the open inclusion. If $\mathcal {X}(\Sigma )$ and $\mathcal {X}(\sigma )$ are the canonical stacks over $X(\Sigma )$ and $X(\sigma )$ , respectively, and $\pi (\Sigma ): \mathcal {X}(\Sigma ) \to X(\Sigma )$ and $\pi (\sigma ): \mathcal {X}(\sigma ) \to X(\sigma )$ are the canonical maps, then there exists a map $\mathcal {X}(\sigma ) \to \mathcal {X}(\Sigma )$ such that

is a fibre product diagram.

For the remainder of this subsection, let $\sigma $ be a d-dimensional pointed rational cone in $N_{\mathbb {R}}$ , let X be the affine T-toric variety associated to $\sigma $ , let $\mathcal {X}$ be the canonical stack over X and let $\pi : \mathcal {X} \to X$ be the canonical map. At points later in this paper, we will refer to the following list of notations when we want to set it, and we also set it for the remainder of this subsection:

Notation 2.19.

  • Let $M = N^*$ .

  • Let $\widetilde {N}$ be the free abelian group with generators indexed by the rays of $\sigma $ .

  • Let $\widetilde {M} = \widetilde {N}^*$ .

  • Let $\langle \cdot , \cdot \rangle $ denote both pairings $N \otimes _{\mathbb {Z}} M \to \mathbb {Z}$ and $\widetilde {N} \otimes _{\mathbb {Z}} \widetilde {M} \to \mathbb {Z}$ .

  • Let $\widetilde {T} = \operatorname {\mathrm {Spec}}\left (k\left [\widetilde {M}\right ]\right )$ be the algebraic torus with cocharacter lattice $\widetilde {N}$ .

  • Let $\widetilde {\sigma }$ be the positive orthant of $\widetilde {N}_{\mathbb {R}}$ – that is, $\widetilde {\sigma }$ is the positive span of those generators of $\widetilde {N}$ that are indexed by the rays of $\sigma $ .

  • Let $\widetilde {X}$ be the affine $\widetilde {T}$ -toric variety associated to $\widetilde {\sigma }$ .

  • Let $\beta : \widetilde {\sigma } \cap \widetilde {N} \to \sigma \cap N$ be the monoid map taking the generator of $\widetilde {N}$ indexed by a ray of $\sigma $ to the first lattice point of that ray.

  • Let $\widetilde {\pi }: \widetilde {X} \to X$ be the toric map associated to $\beta ^{\mathrm {gp}}: \widetilde {N} \to N$ .

  • Let $P = \sigma ^\vee \cap M$ . Note that $X = \operatorname {\mathrm {Spec}}(k[P])$ .

  • Let $F = \widetilde {\sigma }^\vee \cap \widetilde {M}$ . Note that $\widetilde {X} = \operatorname {\mathrm {Spec}}(k[F])$ .

  • Identify P with its image under the injection $P \hookrightarrow F$ given by dualising $\beta $ . Note that $P \hookrightarrow F$ is injective because $\sigma $ is full-dimensional.

  • Let $A = F^{\mathrm {gp}}/P^{\mathrm {gp}} = \widetilde {M}/ M$ .

  • Let $G = \operatorname {\mathrm {Spec}}(k[A])$ be the kernel of the algebraic group homomorphism $\widetilde {T} \to T$ obtained by restricting $\widetilde {\pi }$ , and let G act on $\widetilde {X}$ by restricting the toric action of $\widetilde {T}$ on $\widetilde {X}$ .

By definition, the canonical stack $\mathcal {X}$ is equal to the stack quotient $\left [\widetilde {X}/G\right ]$ and the morphism $\widetilde {\pi }: \widetilde {X} \to X$ is the composition $\widetilde {X} \to \left [\widetilde {X} / G\right ] = \mathcal {X} \xrightarrow {\pi } X$ .

We note that because our focus is on singular varieties instead of on stacks, we simplify our exposition by focusing on canonical stacks over toric varieties instead of all fantastacks. The expositional advantage is that canonical stacks depend only on the toric variety and not on additional data, as is the case for other fantastacks. We end this section with two remarks which explain why we have not lost any generality by making this expositional simplification and discuss a generalisation of Theorem 1.7.

Remark 2.20. For Theorem 1.7, it is sufficient to consider canonical stacks, as these are precisely the fantastacks satisfying the hypotheses of Conjecture 1.1. Nonetheless, we note that with only superficial modifications to our techniques, one can actually prove a more general statement than Theorem 1.7, which we explain here.

With notation as in Definition 2.16, let $\mathcal {X}=\mathcal {F}_{\Sigma ,\nu }$ be a fantastack. Assume that $X=X_\Sigma $ is $\mathbb {Q}$ -Gorenstein, so for each maximal cone $\sigma \in \Sigma $ , there exist $q_\sigma \in N^*$ and $m_\sigma \in \mathbb {Z}_{>0}$ such that the set

$$ \begin{align*} \mathcal{H}_\sigma:=\{v\in \sigma\cap N\mid\langle q_\sigma,v\rangle=m_\sigma\} \end{align*} $$

contains the first lattice point of every ray of $\sigma $ . We say the good moduli space map $\pi \colon \mathcal {X}\to X$ is combinatorially crepant if $\nu (e_i)\in \bigcup _\sigma \mathcal {H}_\sigma $ for every $i\in \{1,\dotsc ,r\}$ .

For example, the canonical stack is combinatorially crepant over X. Since Lemma 7.9 holds for all fantastacks that are combinatorially crepant over their good moduli space, the conclusions of Conjecture 1.1 hold for any fantastack that is combinatorially crepant over its good moduli space.

Remark 2.21. If $\mathcal {F}_{\Sigma , \nu }$ is a fantastack over X, then $\mathcal {F}_{\Sigma , \nu } \to X$ is an isomorphism over a nonempty open subset of X if and only if $\nu $ does not send any standard basis vector to $0$ . Since Proposition 2.14 holds for every fantastack satisfying the hypotheses of Conjecture 1.2, our proofs show that Theorem 1.11 holds for any fantastack as well.

3 Motivic integration for stacks

For the remainder of this paper, by a quotient stack over k we will mean an Artin stack over k that is isomorphic to the stack quotient of a k-scheme by the action of a linear algebraic group over k.

Remark 3.1. Let G be a linear algebraic group over k acting on a k-scheme $\widetilde {X}$ , and let $G \hookrightarrow G'$ be an inclusion of G as a closed subgroup of a linear algebraic group $G'$ over k. Then we have an isomorphism

$$ \begin{align*} \left[\widetilde{X} / G\right] \cong \left[\left(\widetilde{X} \times^G G'\right)/G'\right], \end{align*} $$

where $\widetilde {X} \times ^G G'$ is the k-scheme with $G'$ -action obtained from $\widetilde {X}$ by pushout along $G \hookrightarrow G'$ . Thus any quotient stack is isomorphic to a stack quotient of a scheme by a general linear group, which in particular is a special group.

In this section we define a notion of motivic integration for quotient stacks. On the one hand, our definition is straightforward: it is more or less identical to motivic integration for schemes, but in various places we need to replace notions for schemes with the obvious analogues for Artin stacks; in particular, our motivic integration for quotient stacks does not depend on a choice of presentation for the stack as a quotient. On the other hand, our notion allows explicit computations in terms of motivic integration for schemes, as long as one first writes the stack as a stack quotient of a scheme by a special group.

Definition 3.2. Let $\mathcal {X}$ be an Artin stack over k, and set $n \in \mathbb {N}$ . The nth jet stack of $\mathcal {X}$ , denoted $\mathscr {L}_n(\mathcal {X})$ , is the Weil restriction of $\mathcal {X} \otimes _k k[t]/\left (t^{n+1}\right )$ with respect to the morphism $\operatorname {\mathrm {Spec}}\left (k[t]/\left (t^{n+1}\right )\right ) \to \operatorname {\mathrm {Spec}}(k)$ .

Remark 3.3. Each jet stack $\mathscr {L}_n(\mathcal {X})$ is an Artin stack by [Reference RydhRyd11, Theorem 3.7(iii)].

Remark 3.4. Each jet stack $\mathscr {L}_n(\mathcal {X})$ has affine (geometric) stabilisers by the following argument. Let $y: \operatorname {\mathrm {Spec}}(k') \to \mathscr {L}_n(\mathcal {X})$ be a geometric point corresponding to $\psi _n: \operatorname {\mathrm {Spec}}\left (k'[t]/\left (t^{n+1}\right )\right ) \to \mathcal {X}$ . Because $\mathcal {X}$ has affine (geometric) stabilisers, the reduction of the stabiliser of $\psi _n$ is affine, so the stabiliser of $\psi _n$ is affine. Thus the stabiliser of y, which is the Weil restriction of the stabiliser of $\psi _n$ , is affine.

The morphisms $k[t]/\left (t^{n+1}\right ) \to k[t]/\left (t^{m+1}\right )$ , when $n \geq m$ , induce truncation morphisms $\theta ^n_m: \mathscr {L}_n(\mathcal {X}) \to \mathscr {L}_m(\mathcal {X})$ for any Artin stack $\mathcal {X}$ over k. Like in the case of schemes, we use these truncation morphisms to define arcs of $\mathcal {X}$ and a stack parametrising them.

Definition 3.5. Let $\mathcal {X}$ be an Artin stack over k. The arc stack of $\mathcal {X}$ is the inverse limit $\mathscr {L}(\mathcal {X}) = \varprojlim _n \mathscr {L}_n(\mathcal {X})$ , where the inverse limit is taken with respect to the truncation morphisms $\theta ^n_m: \mathscr {L}_n(\mathcal {X}) \to \mathscr {L}_m(\mathcal {X})$ .

Remark 3.6. The name arc stack is justified by the fact that $\mathscr {L}(\mathcal {X})$ is indeed a stack (see, for example, [Reference TalpoTal14, Proposition 2.1.9]). Since $\mathscr {L}(\mathcal {X})$ is a stack as opposed to an Artin stack, we use the symbol $\lvert \mathscr {L}(\mathcal {X})\rvert $ to denote equivalence classes of points but do not define a topology on this set.

Remark 3.7. Let $\mathcal {X}$ be an Artin stack over k, and let $k'$ be a field extension of k. The truncation morphism induces a functor for each $n \in \mathbb {N}$ , and these functors induce a functor . Since $\mathcal {X}$ is an Artin stack, the functor is an equivalence of categories, for example by Artin’s criterion for algebraicity. Throughout this paper, we will often implicitly make this identification.

We will let each $\theta _n: \mathscr {L}(\mathcal {X}) \to \mathscr {L}_n(\mathcal {X})$ denote the canonical morphism, and we will also call these truncation morphisms.

We will eventually define a notion of measurable subsets of $\lvert \mathscr {L}(\mathcal {X})\rvert $ and a motivic measure $\mu _{\mathcal {X}}$ that assigns an element of $\widehat {\mathscr {M}}_k$ to each of these measurable subsets. We begin with an important special case of measurable subsets. Note that when $\mathcal {X}$ is finite type over k, so is each $\mathscr {L}_n(\mathcal {X})$ , by [Reference RydhRyd11, Proposition 3.8(xv)].

Definition 3.8. Let $\mathcal {X}$ be a finite-type Artin stack over k, and set $\mathcal {C} \subset \lvert \mathscr {L}(\mathcal {X})\rvert $ . We call the subset $\mathcal {C}$ a cylinder if there exist some $n \in \mathbb {N}$ and a constructible subset $\mathcal {C}_n \subset \lvert \mathscr {L}_n(\mathcal {X})\rvert $ such that $\mathcal {C} = (\theta _n)^{-1}(\mathcal {C}_n)$ .

The next theorem, which we will prove later in this section, allows us to define a motivic integration for quotient stacks that is closely related to motivic integration for schemes.

Theorem 3.9. Let $\mathcal {X}$ be an equidimensional finite-type quotient stack over k, and let $\mathcal {C} \subset \lvert \mathscr {L}(\mathcal {X})\rvert $ be a cylinder. Then the set $\theta _n(\mathcal {C}) \subset \lvert \mathscr {L}_n(\mathcal {X})\rvert $ is constructible for each $n \in \mathbb {N}$ , and the sequence

$$ \begin{align*} \left\{\mathrm{e}(\theta_n(\mathcal{C})) \mathbb{L}^{-(n+1)\dim\mathcal{X}}\right\}_{n \in \mathbb{N}} \subset \widehat{\mathscr{M}}_k \end{align*} $$

converges.

Furthermore, suppose that G is a special group over k and $\widetilde {X}$ is a k-scheme with G-action such that there exists an isomorphism $\left [\widetilde {X} / G\right ] \xrightarrow {\sim } \mathcal {X}$ , let $\rho : \widetilde {X} \to \mathcal {X}$ be the composition of the quotient map $\widetilde {X} \to \left [\widetilde {X} / G\right ]$ with the isomorphism $\left [\widetilde {X} / G\right ] \xrightarrow {\sim } \mathcal {X}$ and let $\widetilde {C} = \mathscr {L}(\rho )^{-1}(\mathcal {C})$ . Then $\widetilde {C} \subset \mathscr {L}(\widetilde {X})$ is a cylinder, and

$$ \begin{align*} \lim_{n \to \infty} \mathrm{e}(\theta_n(\mathcal{C}))\mathbb{L}^{-(n+1)\dim\mathcal{X}} = \mu_{\widetilde{X}} \left(\widetilde{C}\right) \mathrm{e}(G)^{-1} \mathbb{L}^{\dim G} \in \widehat{\mathscr{M}}_k. \end{align*} $$

Remark 3.10. Let G and $\widetilde {X}$ be as in the statement of Theorem 3.9. Since $\left [\widetilde {X}/G\right ]$ is equidimensional and G is geometrically irreducible, $\widetilde {X}$ is equidimensional as well, and hence $\mu _{\widetilde {X}}$ is well defined.

Before we prove Theorem 3.9, we will discuss some useful consequences. First, we can define the motivic measure $\mu _{\mathcal {X}}$ on cylinders.

Definition 3.11. Let $\mathcal {X}$ be an equidimensional finite-type quotient stack over k, and let $\mathcal {C} \subset \lvert \mathscr {L}(\mathcal {X})\rvert $ be a cylinder. The motivic measure of $\mathcal {C}$ is

$$ \begin{align*} \mu_{\mathcal{X}}(\mathcal{C}) = \lim_{n \to \infty} \mathrm{e}(\theta_n(\mathcal{C}))\mathbb{L}^{-(n+1)\dim\mathcal{X}} \in \widehat{\mathscr{M}}_k. \end{align*} $$

Remark 3.12. Let $\mathcal {X}$ be an equidimensional smooth Artin (not necessarily quotient) stack over k and let $\mathcal {C} \subset \lvert \mathscr {L}(\mathcal {X})\rvert $ be a cylinder. One can verify that $\theta _n(\mathcal {C}) \subset \lvert \mathscr {L}_n(\mathcal {X})\rvert $ is constructible for each $n \in \mathbb {N}$ and that $\left \{\mathrm {e}(\theta _n(\mathcal {C})) \mathbb {L}^{-(n+1)\dim \mathcal {X}}\right \}_{n \in \mathbb {N}}$ stabilises for sufficiently large n, so Definition 3.11 also makes sense here. Although this is not used for the main results of this paper, our main conjectures are stated in the generality, so we provide the argument for completeness in subsection 3.5.

We now define measurable subsets analogously to the case of schemes.

Definition 3.13. Let $\mathcal {X}$ be an equidimensional finite-type quotient stack over k, set $\mathcal {C} \subset \lvert \mathscr {L}(\mathcal {X})\rvert $ and $\varepsilon \in \mathbb {R}_{>0}$ , let I be a set, let $\mathcal {C}^{(0)} \subset \lvert \mathscr {L}(\mathcal {X})\rvert $ be a cylinder and let $\left \{\mathcal {C}^{(i)}\right \}_{i \in I}$ be a collection of cylinders in $\lvert \mathscr {L}(\mathcal {X})\rvert $ .

We say that $\left (\mathcal {C}^{(0)}, \left (\mathcal {C}^{(i)}\right )_{i \in I}\right )$ is a cylindrical $\varepsilon $ -approximation of $\mathcal {C}$ if

$$ \begin{align*} \left(\mathcal{C} \cup \mathcal{C}^{(0)}\right) \setminus \left(\mathcal{C} \cap \mathcal{C}^{(0)}\right) \subset \bigcup_{i \in I} \mathcal{C}^{(i)} \end{align*} $$

and, for all $i \in I$ ,

$$ \begin{align*} \left\lVert\mu_{\mathcal{X}}\left(\mathcal{C}^{(i)}\right)\right\rVert < \varepsilon. \end{align*} $$

Definition 3.14. Let $\mathcal {X}$ be an equidimensional finite-type quotient stack over k, and set $\mathcal {C} \subset \lvert \mathscr {L}(\mathcal {X})\rvert $ . We say that $\mathcal {C}$ is measurable if for any $\varepsilon \in \mathbb {R}_{>0}$ , there exists a cylindrical $\varepsilon $ -approximation of $\mathcal {C}$ .

Remark 3.15. Let $\mathcal {X}$ be an equidimensional finite-type quotient stack over k, and let $\mathcal {C} \subset \lvert \mathscr {L}(\mathcal {X})\rvert $ be a cylinder. Then for any $\varepsilon \in \mathbb {R}_{>0}$ , we have that $(\mathcal {C}, \emptyset )$ is a cylindrical $\varepsilon $ -approximation of $\mathcal {C}$ . In particular, $\mathcal {C}$ is measurable.

We now see that Theorem 3.9 allows us to extend $\mu _{\mathcal {X}}$ to measurable subsets.

Corollary 3.16. Let $\mathcal {X}$ be an equidimensional finite-type quotient stack over k, and let $\mathcal {C} \subset \lvert \mathscr {L}(\mathcal {X})\rvert $ be a measurable subset. Then there exists a unique $\mu _{\mathcal {X}}(\mathcal {C}) \in \widehat {\mathscr {M}}_k$ such that for any $\varepsilon \in \mathbb {R}_{>0}$ and any cylindrical $\varepsilon $ -approximation $\left (\mathcal {C}^{(0)}, \left (\mathcal {C}^{(i)}\right )_{i \in I}\right )$ of $\mathcal {C}$ ,

$$ \begin{align*} \left\lVert\mu_{\mathcal{X}}(\mathcal{C}) - \mu_{\mathcal{X}}\left(\mathcal{C}^{(0)}\right)\right\rVert < \varepsilon. \end{align*} $$

Furthermore, suppose that $G, \widetilde {X}, \rho $ are as in the statement of Theorem 3.9 and $\widetilde {C}=\mathscr {L}(\rho )^{-1}(\mathcal {C})$ . Then $\widetilde {C} \subset \mathscr {L}\left (\widetilde {X}\right )$ is measurable, and

$$ \begin{align*} \mu_{\mathcal{X}}(\mathcal{C}) = \mu_{\widetilde{X}} \left(\widetilde{C}\right) \mathrm{e}(G)^{-1} \mathbb{L}^{\dim G} \in \widehat{\mathscr{M}}_k. \end{align*} $$

Proof. Let $G, \widetilde {X}, \rho , \widetilde {C}$ be as in the second part of the corollary. For any $\varepsilon \in \mathbb {R}_{>0}$ and any cylindrical $\varepsilon $ -approximation $\left (\mathcal {C}^{(0)}, \left (\mathcal {C}^{(i)}\right )_{i \in I}\right )$ of $\mathcal {C}$ , Theorem 3.9 implies that $\left (\mathscr {L}(\rho )^{-1}\left (\mathcal {C}^{(0)}\right ), \left (\mathscr {L}(\rho )^{-1}\left (\mathcal {C}^{(i)}\right )\right )_{i \in I}\right )$ is a cylindrical $\varepsilon \left \lVert \mathrm {e}(G) \mathbb {L}^{-\dim G}\right \rVert $ -approximation of $\widetilde {C}$ . Thus $\widetilde {C}$ is measurable, and for any cylindrical $\varepsilon $ -approximation $\left (\mathcal {C}^{(0)}, \left (\mathcal {C}^{(i)}\right )_{i \in I}\right )$ of $\mathcal {C}$ ,

$$ \begin{align*} \left\lVert\mu_{\widetilde{X}} \left(\widetilde{C}\right)\right.& \left.\mathrm{e}(G)^{-1} \mathbb{L}^{\dim G} - \mu_{\mathcal{X}}\left(\mathcal{C}^{(0)}\right)\right\rVert\\ &= \left\lVert\mu_{\widetilde{X}} \left(\widetilde{C}\right) \mathrm{e}(G)^{-1} \mathbb{L}^{\dim G} - \mu_{\widetilde{X}} \left(\mathscr{L}(\rho)^{-1}\left(\mathcal{C}^{(0)}\right)\right) \mathrm{e}(G)^{-1} \mathbb{L}^{\dim G}\right\rVert\\ &\leq \left\lVert \mathrm{e}(G)^{-1} \mathbb{L}^{\dim G} \right\rVert \left\lVert \mu_{\widetilde{X}}\left(\widetilde{C}\right) - \mu_{\widetilde{X}}\left(\mathscr{L}(\rho)^{-1}\left(\mathcal{C}^{(0)}\right)\right) \right\rVert\\ &< \varepsilon \left\lVert \mathrm{e}(G)^{-1} \mathbb{L}^{\dim G} \right\rVert \left\lVert\mathrm{e}(G) \mathbb{L}^{-\dim G}\right\rVert, \end{align*} $$

where the first equality follows from Theorem 3.9. Once $\mu _{\mathcal {X}}(\mathcal {C})$ is shown to exist, this chain of inequalities proves $\mu _{\mathcal {X}}(\mathcal {C}) = \mu _{\widetilde {X}} \left (\widetilde {C}\right ) \mathrm {e}(G)^{-1} \mathbb {L}^{\dim G}$ . To show the existence of $\mu _{\mathcal {X}}(\mathcal {C})$ , it suffices by Remark 3.1 to assume G is a general linear group, so this chain of inequalities and Lemma 3.17 finish the proof.

Lemma 3.17. Let G be a general linear group over k. Then

$$ \begin{align*} \left\lVert \mathrm{e}(G)^{-1} \mathbb{L}^{\dim G} \right\rVert \left\lVert\mathrm{e}(G) \mathbb{L}^{-\dim G}\right\rVert = 1. \end{align*} $$

Proof. Using Euler–Poincaré polynomials, it is straightforward to check (see, for example, the proof of [Reference Chambert-Loir, Nicaise and SebagCLNS18, Chapter 2, Lemma 4.1.3]) that if $n_0 \in \mathbb {Z}$ and $\{c_n\}_{n \geq n_0}$ is a sequence of integers with $c_{n_0} \neq 0$ , then

$$ \begin{align*} \left\lVert \sum_{n \geq n_0} c_n \mathbb{L}^{-n} \right\rVert = \exp(-n_0). \end{align*} $$

The lemma then follows from the fact that $\mathrm {e}(G)$ is a polynomial in $\mathbb {L}$ (see, for example, the proof of [Reference JoyceJoy07, Lemma 4.6]).

Definition 3.18. Let $\mathcal {X}$ be an equidimensional finite-type quotient stack over k, and let $\mathcal {C} \subset \lvert \mathscr {L}(\mathcal {X})\rvert $ be a measurable subset. The motivic measure of $\mathcal {C}$ is defined to be $\mu _{\mathcal {X}}(\mathcal {C}) \in \widehat {\mathscr {M}}_k$ , as in the statement of Corollary 3.16.

Remark 3.19. Remark 3.15 implies that Definition 3.18 generalises Definition 3.11.

In the next two subsections, we will prove Theorem 3.9.

3.1 Jet schemes of quotient stacks

In this subsection, we describe the jet schemes of a stack quotient as stack quotients themselves. This is the first step in providing the relationship between motivic integration for quotient stacks and motivic integration for schemes. This description, Corollary 3.22, is a special case of the next proposition, which describes the Weil restriction of a stack quotient.

If $S'$ and S are schemes and $S' \to S$ is a finite flat morphism of finite presentation, we will let $\mathscr {R}_{S'/S}$ denote the functor taking each stack over $S'$ to its Weil restriction with respect to $S' \to S$ , and we note that if $\mathcal {X}$ is an Artin stack over $S'$ , then $\mathscr {R}_{S'/S}(\mathcal {X})$ is an Artin stack over S [Reference RydhRyd11, Theorem 3.7(iii)].

Proposition 3.20. Let $S'$ and S be schemes and $S' \to S$ be a finite flat morphism of finite presentation. If $\widetilde {X}'$ is an $S'$ -scheme with an action by a linear algebraic group $G'$ over $S'$ , then there exists an isomorphism

$$ \begin{align*} \mathscr{R}_{S'/S}\left(\left[\widetilde{X}'/G'\right]\right)\xrightarrow{\sim} \left[\mathscr{R}_{S'/S}\left(\widetilde{X}'\right)/\mathscr{R}_{S'/S}(G')\right] \end{align*} $$

such that

commutes.

Remark 3.21. In the statement of Proposition 3.20, the action of $\mathscr {R}_{S'/S}(G')$ on $\mathscr {R}_{S'/S}\left (\widetilde {X}'\right )$ is obtained by applying $\mathscr {R}_{S'/S}$ to the map $G' \times _{S'} \widetilde {X}' \to \widetilde {X}'$ defining the action of $G'$ on $\widetilde {X}'$ .

Proof. We let $\mathcal {X}'=\left [\widetilde {X}'/G'\right ]$ , $\rho ': \widetilde {X}' \to \mathcal {X}'$ be the quotient map, $\mathcal {X}=\mathscr {R}_{S'/S}(\mathcal {X}')$ , $\widetilde {X}=\mathscr {R}_{S'/S}\left (\widetilde {X}'\right )$ and $G=\mathscr {R}_{S'/S}(G')$ . Since $\rho '\colon \widetilde {X}'\to \mathcal {X}'$ is a smooth cover, $\mathscr {R}_{S'/S}(\rho ')\colon \widetilde {X}\to \mathcal {X}$ is as well, by [Reference RydhRyd11, Proposition 3.5(v)]. Since $\rho '$ is a $G'$ -torsor, the natural map $G'\times _{S'} \widetilde {X}'\to \widetilde {X}'\times _{\mathcal {X}'} \widetilde {X}'$ induced by the $G'$ -action $G' \times _{S'} \widetilde {X}' \to \widetilde {X}'$ is an isomorphism, and applying Weil restriction, we see that the map $G\times _S \widetilde {X}\to \widetilde {X}\times _{\mathcal {X}} \widetilde {X}$ induced by the G-action $G \times _S \widetilde {X} \to \widetilde {X}$ is an isomorphism as well. Thus, $\mathscr {R}_{S'/S}(\rho ')\colon \widetilde {X}\to \mathcal {X}$ is a G-torsor, thereby inducing an isomorphism $\mathcal {X}\xrightarrow {\sim }\left [\widetilde {X}/G\right ]$ which makes the diagram in the statement of the proposition commute.

By the definition of jet stacks, the following is a special case of Proposition 3.20:

Corollary 3.22. Let G be a linear algebraic group over k acting on a k-scheme $\widetilde {X}$ , and set $n \in \mathbb {N}$ . There exists an isomorphism

$$ \begin{align*} \mathscr{L}_n\left(\left[\widetilde{X}/G\right]\right) \xrightarrow{\sim} \left[\mathscr{L}_n\left(\widetilde{X}\right)/\mathscr{L}_n(G)\right], \end{align*} $$

such that

commutes.

Remark 3.23. In the statement of Corollary 3.22, the action of $\mathscr {L}_n(G)$ on $\mathscr {L}_n\left (\widetilde {X}\right )$ is obtained by applying $\mathscr {L}_n$ to the map $G \times _{k} \widetilde {X} \to \widetilde {X}$ defining the G-action on $\widetilde {X}$ .

3.2 Truncation morphisms and quotient stacks

Lemma 3.24. Let $\mathcal {X}$ be an Artin stack over k, let $\widetilde {X}$ be a scheme over k and let $\rho : \widetilde {X} \to \mathcal {X}$ be a smooth covering. Set $\mathcal {C} \subset \lvert \mathscr {L}(\mathcal {X})\rvert $ and $\widetilde {C} = \mathscr {L}(\rho )^{-1}(\mathcal {C}) \subset \mathscr {L}\left (\widetilde {X}\right )$ . Then for all $n \in \mathbb {N}$ ,

$$ \begin{align*} \mathscr{L}_n(\rho)^{-1}(\theta_n(\mathcal{C})) = \theta_n\left(\widetilde{C}\right). \end{align*} $$

Proof. Set $n \in \mathbb {N}$ . Clearly, $\theta _n\left (\widetilde {C}\right ) \subset \mathscr {L}_n(\rho )^{-1}(\theta _n(\mathcal {C}))$ .

To prove the opposite inclusion, let $k'$ be a field extension of k, and let $\widetilde {\psi }_n \in \mathscr {L}_n\left (\widetilde {X}\right )(k')$ and $\psi \in \mathscr {L}(\mathcal {X})(k')$ be such that the class of $\psi $ in $\lvert \mathscr {L}(\mathcal {X})\rvert $ is contained in $\mathcal {C}$ and $\mathscr {L}_n(\rho )\left (\widetilde {\psi }_n\right ) \cong \theta _n(\psi )$ . We must show $\widetilde {\psi }_n\in \theta _n\left (\widetilde {C}\right )$ . Since $\rho $ is smooth, by the infinitesimal lifting criterion, we have a dotted arrow filling in the following diagram:

Then $\widetilde {\psi }\in \widetilde {C}$ , so $\widetilde {\psi }_n\in \theta _n\left (\widetilde {C}\right )$ .

We may now prove the next proposition, which by Remark 3.1 and Remark 3.10 implies Theorem 3.9.

Proposition 3.25. Let G be a special group over k, let $\widetilde {X}$ be an equidimensional finite-type scheme over k with G-action, let $\mathcal {X} = \left [\widetilde {X}/G\right ]$ , let $\rho : \widetilde {X} \to \mathcal {X}$ be the quotient map, let $\mathcal {C} \subset \lvert \mathscr {L}(\mathcal {X})\rvert $ be a cylinder and let $\widetilde {C} = \mathscr {L}(\rho )^{-1}(\mathcal {C})$ . Then $\widetilde {C} \subset \mathscr {L}(\widetilde {X})$ is a cylinder, the set $\theta _n(\mathcal {C}) \subset \lvert \mathscr {L}_n(\mathcal {X})\rvert $ is constructible for each $n \in \mathbb {N}$ , and the sequence

$$ \begin{align*} \left\{\mathrm{e}(\theta_n(\mathcal{C})) \mathbb{L}^{-(n+1)\dim\mathcal{X}}\right\}_{n \in \mathbb{N}} \subset \widehat{\mathscr{M}}_k \end{align*} $$

converges to

$$ \begin{align*} \mu_{\widetilde{X}} \left(\widetilde{C}\right) \mathrm{e}(G)^{-1} \mathbb{L}^{\dim G} \in \widehat{\mathscr{M}}_k. \end{align*} $$

Remark 3.26. In the statement of Proposition 3.25, because G is irreducible, the irreducible components of $\widetilde {X}$ are G-invariant, so $\mathcal {X}$ is equidimensional.

Proof. We first show that $\widetilde {C} \subset \mathscr {L}\left (\widetilde {X}\right )$ is a cylinder. Because $\mathcal {C}$ is a cylinder, there exist some $n \in \mathbb {N}$ and some constructible subset $\mathcal {C}_n \subset \lvert \mathscr {L}_n(\mathcal {X})\rvert $ such that $\mathcal {C} = (\theta _n)^{-1}(\mathcal {C}_n)$ . Then $\widetilde {C} = (\theta _n)^{-1}\left (\mathscr {L}_n(\rho )^{-1}(\mathcal {C}_n)\right )$ is a cylinder.

Now we will show that for all $n \in \mathbb {N}$ , the set $\theta _n(\mathcal {C})$ is a constructible subset of $\mathscr {L}_n(\mathcal {X})$ . Each $\theta _n\left (\widetilde {C}\right )$ is a constructible subset of $\mathscr {L}_n\left (\widetilde {X}\right )$ . Therefore each $\theta _n(\mathcal {C}) \subset \lvert \mathscr {L}_n(\mathcal {X})\rvert $ is constructible, by Chevalley’s theorem for Artin stacks [Reference Hall and RydhHR17, Theorem 5.2], Corollary 3.22 and Lemma 3.24.

Then since G is a special group, $\mathscr {L}_n(G)$ is as well, by Remark 2.4. Then Corollary 3.22 and Lemma 3.24 imply that for each $n \in \mathbb {N}$ ,

$$ \begin{align*} \mathrm{e}(\theta_n(\mathcal{C})) = \mathrm{e}\left(\theta_n\left(\widetilde{C}\right)\right)\mathrm{e}(\mathscr{L}_n(G))^{-1} = \mathrm{e}\left(\theta_n\left(\widetilde{C}\right)\right) \mathrm{e}(G)^{-1} \mathbb{L}^{-n\dim G}, \end{align*} $$

where the second equality holds because G is smooth. Therefore,

$$ \begin{align*} \mu_{\widetilde{X}}(\widetilde{C})\mathrm{e}(G)^{-1}\mathbb{L}^{\dim G} &= \lim_{n \to \infty} \mathrm{e}\left(\theta_n\left(\widetilde{C}\right)\right) \mathrm{e}(G)^{-1} \mathbb{L}^{\dim G -(n+1)\dim \widetilde{X}}\\ &= \lim_{n \to \infty} \mathrm{e}(\theta_n(\mathcal{C})) \mathbb{L}^{-(n+1)\dim\mathcal{X}}.\\[-36pt] \end{align*} $$

3.3 Properties of motivic integration for quotient stacks

We now state some basic properties of motivic integration for quotient stacks. We will use these properties later in this paper.

Proposition 3.27. Let $\mathcal {X}$ be an equidimensional finite-type quotient stack over k, let $\left \{\mathcal {C}^{(i)}\right \}_{i \in \mathbb {N}}$ be a sequence of pairwise disjoint measurable subsets of $\lvert \mathscr {L}(\mathcal {X})\rvert $ and let $\mathcal {C} = \bigcup _{i= 0}^\infty \mathcal {C}^{(i)}$ . If $\lim _{i \to \infty } \mu _{\mathcal {X}}\left (\mathcal {C}^{(i)}\right ) = 0$ , then $\mathcal {C}$ is measurable and

$$ \begin{align*} \mu_{\mathcal{X}}(\mathcal{C}) = \sum_{i = 0}^\infty \mu_{\mathcal{X}}\left(\mathcal{C}^{(i)}\right). \end{align*} $$

Proof. The set $\mathcal {C}$ is measurable by the exact same proof used for the analogous statement for schemes in [Reference Chambert-Loir, Nicaise and SebagCLNS18, Chapter 6, Proposition 3.4.2]. The remainder of the proposition follows from Corollary 3.16 and the analogous statement for schemes [Reference Chambert-Loir, Nicaise and SebagCLNS18, Chapter 6, Proposition 3.4.3] applied to the scheme $\widetilde {X}$ in the statement of Corollary 3.16.

Proposition 3.28. Let $\mathcal {X}$ be an equidimensional finite-type quotient stack over k, and set $\mathcal {C} \subset \mathcal {D} \subset \lvert \mathscr {L}(\mathcal {X})\rvert $ . If $\mathcal {D}$ is measurable and $\mu _{\mathcal {X}}(\mathcal {D}) = 0$ , then $\mathcal {C}$ is measurable and $\mu _{\mathcal {X}}(\mathcal {C}) = 0$ .

Proof. The proposition holds by the exact same proof used for the analogous statement for schemes in [Reference Chambert-Loir, Nicaise and SebagCLNS18, Chapter 6, Corollary 3.5.5(a)].

Proposition 3.29. Let $\mathcal {X}$ be an equidimensional finite-type quotient stack over k, and let $\mathcal {C}, \mathcal {D}$ be measurable subsets of $\lvert \mathscr {L}(\mathcal {X})\rvert $ . If $\mathcal {C} \subset \mathcal {D}$ , then

$$ \begin{align*} \lVert \mu_{\mathcal{X}}(\mathcal{C}) \rVert \leq \lVert \mu_{\mathcal{X}}(\mathcal{D}) \rVert. \end{align*} $$

Proof. By Remark 3.1, there exist $G, \widetilde {X}, \rho $ as in the statement of Theorem 3.9 such that G is a general linear group. Let $\widetilde {C} = \mathscr {L}(\rho )^{-1}(\mathcal {C})$ and $\widetilde {D} = \mathscr {L}(\rho )^{-1}(\mathcal {D})$ . Then

$$ \begin{align*} \lVert \mu_{\mathcal{X}}(\mathcal{C}) \rVert &= \left\lVert \mu_{\widetilde{X}}\left(\widetilde{C}\right)\mathrm{e}(G)^{-1}\mathbb{L}^{\dim G} \right\rVert\\ &\leq \left\lVert \mathrm{e}(G)^{-1}\mathbb{L}^{\dim G}\right\rVert \left\lVert \mu_{\widetilde{X}}\left(\widetilde{C}\right)\right\rVert\\ &\leq \left\lVert \mathrm{e}(G)^{-1}\mathbb{L}^{\dim G}\right\rVert \left\lVert \mu_{\widetilde{X}}\left(\widetilde{D}\right)\right\rVert\\ &= \left\lVert \mathrm{e}(G)^{-1}\mathbb{L}^{\dim G}\right\rVert \left\lVert \mu_{\mathcal{X}}(\mathcal{D}) \mathrm{e}(G)\mathbb{L}^{-\dim G}\right\rVert\\ &\leq \left\lVert \mathrm{e}(G)^{-1} \mathbb{L}^{\dim G} \right\rVert \left\lVert\mathrm{e}(G) \mathbb{L}^{-\dim G}\right\rVert \lVert \mu_{\mathcal{X}}(\mathcal{D}) \rVert\\ &= \lVert \mu_{\mathcal{X}}(\mathcal{D}) \rVert, \end{align*} $$

where the first and fourth lines follow from Corollary 3.16, the third line follows from the analogous statement [Reference Chambert-Loir, Nicaise and SebagCLNS18, Chapter 6, Corollary 3.3.5] for schemes applied to $\widetilde {X}$ and the last line follows from Lemma 3.17.

Proposition 3.30. Let $\mathcal {X}$ be an equidimensional finite-type quotient stack over k, let $\mathcal {Y}$ be a closed substack of $\mathcal {X}$ with $\dim \mathcal {Y} < \dim \mathcal {X}$ and let $\mathcal {C} \subset \lvert \mathscr {L}(\mathcal {X})\rvert $ be the image of $\lvert \mathscr {L}(\mathcal {Y})\rvert $ in $\lvert \mathscr {L}(\mathcal {X})\rvert $ . Then $\mathcal {C}$ is measurable and $\mu _{\mathcal {X}}(\mathcal {C}) = 0$ .

Proof. For each $n \in \mathbb {N}$ , let $\mathcal {C}_n \subset \lvert \mathscr {L}_n(\mathcal {X})\rvert $ be the image of $\lvert \mathscr {L}_n(\mathcal {Y})\rvert $ in $\lvert \mathscr {L}_n(\mathcal {X})\rvert $ , and let $\mathcal {C}^{(n)} = (\theta _n)^{-1}(\mathcal {C}_n)$ . By [Reference RydhRyd11, Proposition 3.5(vi)], each $\mathcal {C}_n$ is a closed subset of $\mathscr {L}_n(\mathcal {X})$ , so each $\mathcal {C}^{(n)}$ is a cylinder in $\mathscr {L}(\mathcal {X})$ .

By Remark 3.1, there exist $G, \widetilde {X}, \rho $ as in the statement of Theorem 3.9. Let $\widetilde {Y} = \widetilde {X} \times _{\mathcal {X}} \mathcal {Y}$ . Then $\mathscr {L}_n(\rho )^{-1}(\mathcal {C}_n)$ is the underlying set of $\mathscr {L}_n\left (\widetilde {Y}\right )$ . Thus by Theorem 3.9,

$$ \begin{align*} \mu_{\mathcal{X}}\left(\mathcal{C}^{(n)}\right) &= \mu_{\widetilde{X}} \left(\mathscr{L}(\rho)^{-1}\left(\mathcal{C}^{(n)}\right)\right) \mathrm{e}(G)^{-1} \mathbb{L}^{\dim G}\\ &= \mu_{\widetilde{X}}\left((\theta_n)^{-1}\left(\mathscr{L}_n\left(\widetilde{Y}\right)\right)\right)\mathrm{e}(G)^{-1} \mathbb{L}^{\dim G}. \end{align*} $$

By [Reference Chambert-Loir, Nicaise and SebagCLNS18, Chapter 6, Proposition 2.3.1],

$$ \begin{align*} \lim_{n \to \infty} \mu_{\widetilde{X}}\left((\theta_n)^{-1}\left(\mathscr{L}_n\left(\widetilde{Y}\right)\right)\right) = 0, \end{align*} $$

so

$$ \begin{align*} \lim_{n \to \infty} \mu_{\mathcal{X}}\left(\mathcal{C}^{(n)}\right) = 0. \end{align*} $$

Therefore for any $\varepsilon \in \mathbb {R}_{>0}$ , we get that $\left (\emptyset , \left (\mathcal {C}^{(n)}\right )\right )$ is a cylindrical $\varepsilon $ -approximation of $\mathcal {C}$ for sufficiently large n, and we are done, by the definition of $\mu _{\mathcal {X}}$ .

Proposition 3.31. Let $\mathcal {X}$ be an equidimensional finite-type quotient stack over k, and let $\mathcal {C}$ and $\mathcal {D}$ be measurable subsets of $\lvert \mathscr {L}(\mathcal {X})\rvert $ . Then the intersection $\mathcal {C} \cap \mathcal {D}$ , the union $\mathcal {C} \cup \mathcal {D}$ and the complement $\mathcal {C} \setminus \mathcal {D}$ are all measurable subsets of $\lvert \mathscr {L}(\mathcal {X})\rvert $ .

Proof. The proposition holds by the exact same proof used for the analogous statement for schemes in [Reference Chambert-Loir, Nicaise and SebagCLNS18, Chapter 6, Proposition 3.2.8].

Proposition 3.32. Let $\mathcal {X}$ be an equidimensional finite-type quotient stack over k, let $\iota : \mathcal {U} \hookrightarrow \mathcal {X}$ be the inclusion of an open substack and set $\mathcal {C} \subset (\theta _0)^{-1}(\lvert \mathcal {U}\rvert ) \subset \lvert \mathscr {L}(\mathcal {X})\rvert $ . Then $\mathcal {C}$ is a measurable subset of $\lvert \mathscr {L}(\mathcal {X})\rvert $ if and only if $\mathscr {L}(\iota )^{-1}(\mathcal {C})$ is a measurable subset of $\lvert \mathscr {L}(\mathcal {U})\rvert $ , and in that case,

$$ \begin{align*} \mu_{\mathcal{X}}(\mathcal{C}) = \mu_{\mathcal{U}}\left(\mathscr{L}(\iota)^{-1}(\mathcal{C})\right). \end{align*} $$

Proof. As in the case of schemes, this is an easy consequence of the definitions and the fact that for all $n \in \mathbb {N}$ , the morphism $\mathscr {L}_n(\iota ): \mathscr {L}_n(\mathcal {U}) \to \mathscr {L}_n(\mathcal {X})$ is an open immersion by [Reference RydhRyd11, Proposition 3.5(vii)].

3.4 Nonseparatedness functions

We now introduce notation for the nonseparatedness functions $\operatorname {\mathrm {sep}}_{\pi , \mathcal {C}}$ , $\operatorname {\mathrm {sep}}_\pi $ and $\operatorname {\mathrm {sep}}_{\mathcal {X}}$ that were used in the statements of the main conjectures and theorems of this paper. Throughout this subsection, let $\mathcal {X}$ be an Artin stack over k, set $\mathcal {C} \subset \lvert \mathscr {L}(\mathcal {X})\rvert $ , let X be a scheme over k and let $\pi : \mathcal {X} \to X$ be a map. For any field extension $k'$ of k, we will let $\overline {\mathcal {C}}(k')$ denote the subset of $\overline {\mathscr {L}(\mathcal {X})}(k')$ consisting of arcs whose classes in the set $\lvert \mathscr {L}(\mathcal {X})\rvert $ are contained in $\mathcal {C}$ .

If $k'$ is a field extension of k and $\varphi \in \mathscr {L}(X)(k')$ , we set

$$ \begin{align*} \operatorname{\mathrm{sep}}_{\pi, \mathcal{C}}(\varphi) = \#\left(\overline{\mathcal{C}}(k') \cap \overline{\left(\mathscr{L}(\pi)^{-1}(\varphi)\right)}(k')\right) \in \mathbb{N} \cup \{\infty\}, \end{align*} $$

which induces a map $\operatorname {\mathrm {sep}}_{\pi , \mathcal {C}}: \mathscr {L}(X) \to \mathbb {N} \cup \{\infty \}$ by considering each $\varphi \in \mathscr {L}(X)$ as a point valued in its residue field. If, furthermore, we assume that X is integral, finite type and separated and has log-terminal singularities, that $\operatorname {\mathrm {sep}}_{\pi , \mathcal {C}}: \mathscr {L}(X) \to \mathbb {N} \cup \{\infty \}$ has measurable fibres and that $C \subset \mathscr {L}(X)$ is a measurable subset, then we can consider the motivic integral

$$ \begin{align*} \int_C \operatorname{\mathrm{sep}}_{\pi, \mathcal{C}} \mathrm{d}\mu^{\mathrm{Gor}}_X = \sum_{n \in \mathbb{N}} n \mu^{\mathrm{Gor}}_X\left(\operatorname{\mathrm{sep}}_{\pi, \mathcal{C}}^{-1}(n) \cap C\right) \in \widehat{\mathscr{M}}_k\left[\mathbb{L}^{1/m}\right], \end{align*} $$

where $m \in \mathbb {Z}_{>0}$ is such that $mK_X$ is Cartier. Note that with these assumptions, the series defining $\int _C \operatorname {\mathrm {sep}}_{\pi , \mathcal {C}} \mathrm {d}\mu ^{\mathrm {Gor}}_X$ converges because

$$ \begin{align*} \lim_{n \to \infty} n \mu^{\mathrm{Gor}}_X\left(\operatorname{\mathrm{sep}}_{\pi, \mathcal{C}}^{-1}(n) \cap C\right) = 0, \end{align*} $$

which follows from

$$ \begin{align*} \lim_{n \to \infty} \mu^{\mathrm{Gor}}_X\left(\operatorname{\mathrm{sep}}_{\pi, \mathcal{C}}^{-1}(n) \cap C\right) = 0, \end{align*} $$

which itself, for example, is a consequence of Proposition 2.3.

Set

$$ \begin{align*} \operatorname{\mathrm{sep}}_\pi = \operatorname{\mathrm{sep}}_{\pi, \lvert\mathscr{L}(\mathcal{X})\rvert} \end{align*} $$

and

$$ \begin{align*} \operatorname{\mathrm{sep}}_{\mathcal{X}} = 1/(\operatorname{\mathrm{sep}}_\pi \circ \mathscr{L}(\pi)): \lvert\mathscr{L}(\mathcal{X})\rvert \to \mathbb{Q}_{\geq 0} \cup \{\infty\}. \end{align*} $$

If, furthermore, we assume that $\mathcal {X}$ is an equidimensional and finite-type quotient stack over k and that $\operatorname {\mathrm {sep}}_{\mathcal {X}}: \lvert \mathscr {L}(\mathcal {X})\rvert \to \mathbb {Q}_{\geq 0} \cup \{\infty \}$ has measurable fibres, we can consider the motivic integral

$$ \begin{align*} \int_{\mathscr{L}(\mathcal{X})} \operatorname{\mathrm{sep}}_{\mathcal{X}} \mathrm{d}\mu_{\mathcal{X}} = \sum_{n \in \mathbb{Z}_{\geq 1}} (1/n) \mu_{\mathcal{X}}\left( \operatorname{\mathrm{sep}}_{\mathcal{X}}^{-1}(1/n) \right) \in \widehat{\mathscr{M}_k \otimes_{\mathbb{Z}} \mathbb{Q}}, \end{align*} $$

where the ring $\widehat {\mathscr {M}_k \otimes _{\mathbb {Z}} \mathbb {Q}}$ is defined like $\widehat {\mathscr {M}}_k$ in subsection 2.1 by replacing any mention of $K_0(\mathbf {Var}_k)$ with $K_0(\mathbf {Var}_k) \otimes _{\mathbb {Z}} \mathbb {Q}$ and any mention of ‘subgroup’ with ‘ $\mathbb {Q}$ -subspace’. With these assumptions, the series defining $\int _{\mathscr {L}(\mathcal {X})} \operatorname {\mathrm {sep}}_{\mathcal {X}} \mathrm {d}\mu _{\mathcal {X}}$ converges because

$$ \begin{align*} \lim_{n \to \infty} (1/n) \mu_{\mathcal{X}}\left( \operatorname{\mathrm{sep}}_{\mathcal{X}}^{-1}(1/n) \right) = 0, \end{align*} $$

which by the definition of the norm on $\widehat {\mathscr {M}_k \otimes _{\mathbb {Z}} \mathbb {Q}}$ follows from

$$ \begin{align*} \lim_{n \to \infty} \mu_{\mathcal{X}}\left( \operatorname{\mathrm{sep}}_{\mathcal{X}}^{-1}(1/n) \right) = 0, \end{align*} $$

which itself follows from Corollary 3.16 and properties of motivic measures for schemes.

3.5 Motivic integration for smooth stacks via the cotangent complex

In this subsection, we prove that the motivic measure $\mu _{\mathcal {X}}$ is also well defined when $\mathcal {X}$ is an equidimensional smooth Artin (not necessarily quotient) stack over k. We only explicitly verify this for cylinders, but by a standard argument (identical to the one for schemes in [Reference Chambert-Loir, Nicaise and SebagCLNS18]), it leads to well-defined notions (that coincide with our definitions in the case where $\mathcal {X}$ is a quotient stack) of measurable subsets of $\lvert \mathscr {L}(\mathcal {X})\rvert $ and their motivic measures. The main result of this subsection is the following theorem, which immediately implies that Definition 3.11 makes sense in this setting:

Theorem 3.33. Let $\mathcal {X}$ be an equidimensional smooth Artin stack over k, and let $\mathcal {C} \subset \lvert \mathscr {L}(\mathcal {X})\rvert $ be a cylinder. Then the set $\theta _n(\mathcal {C}) \subset \lvert \mathscr {L}_n(\mathcal {X})\rvert $ is constructible for each $n \in \mathbb {N}$ , and the sequence

$$ \begin{align*} \left\{\mathrm{e}(\theta_n(\mathcal{C})) \mathbb{L}^{-(n+1)\dim\mathcal{X}}\right\}_{n \in \mathbb{N}} \subset K_0(\mathbf{Stack}_k) \end{align*} $$

stabilises for sufficiently large n.

We first prove two lemmas, after which we prove this theorem.

Lemma 3.34. Let $\mathcal {X}$ be an equidimensional smooth Artin stack over k, and set $n \in \mathbb {N}$ . There exist some $\ell \in \mathbb {Z}_{>0}$ , a partition $\lvert \mathscr {L}_n(\mathcal {X})\rvert = \bigsqcup _{i=1}^\ell \mathcal {C}_i$ of $\lvert \mathscr {L}_n(\mathcal {X})\rvert $ into constructible subsets $\mathcal {C}_i$ and some $r_1, \dotsc , r_\ell , j_1, \dotsc , j_\ell \in \mathbb {N}$ such that

  • for any $i \in \{1, \dotsc , \ell \}$ , we have $r_i - j_i = \dim \mathcal {X}$ , and

  • for any $i \in \{1, \dotsc , \ell \}$ , any field extension $k'$ of k and any $\psi _n \in \mathscr {L}_n(\mathcal {X})(k')$ whose class in $\lvert \mathscr {L}_n(\mathcal {X})\rvert $ is contained in $\mathcal {C}_i$ , we have

    $$ \begin{align*} \left(\theta^{n+1}_n\right)^{-1}(\psi_n) \cong \mathbb{A}^{r_i}_{k'} \times_{k'} B\mathbb{G}_{a}^{j_i}. \end{align*} $$

Proof. Fix $\xi _n\colon \operatorname {\mathrm {Spec}} k'\to \mathscr {L}_n(\mathcal {X})$ and let $\mathcal {Y}_{\xi _n}$ denote the fibre of the truncation map $\mathscr {L}_{n+1}(\mathcal {X})\to \mathscr {L}_n(\mathcal {X})$ over $\xi _n$ . For any $\alpha \colon \operatorname {\mathrm {Spec}} A\to \operatorname {\mathrm {Spec}} k'$ , the A-valued points $\mathcal {Y}_{\xi _n}(A)$ are the category of lifts of $\xi _n\otimes _{k'}A$ to $\mathscr {L}_{n+1}(\mathcal {X})$ . For all $m\geq 0$ , let $\mathcal {X}_m=\mathcal {X}\otimes _k k[t]/\left (t^{m+1}\right )$ and let $\alpha _m\colon \operatorname {\mathrm {Spec}} A[t]/\left (t^{m+1}\right )\to \operatorname {\mathrm {Spec}} k'[t]/\left (t^{m+1}\right )$ be the map induced by $\alpha $ ; for $m\leq n$ , let $\varphi _m\colon \operatorname {\mathrm {Spec}} k'[t]/\left (t^{m+1}\right )\to \mathcal {X}_m$ denote the map induced by $\xi _n$ . We then obtain a cartesian diagram

where the curved arrow is the structure map. Let $\mathcal {J}_n$ denote the ideal sheaf of $\operatorname {\mathrm {Spec}} k'[t]/\left (t^{n+1}\right )\to \operatorname {\mathrm {Spec}} k'[t]/\left (t^{n+2}\right )$ considered as a $k'$ -module. By [Reference OlssonOls06, Theorem 1.5] and the fact that $\mathcal {X}_{n+1}$ and $A[t]/\left (t^{n+2}\right )$ are flat over $k[t]/(t^{n+2})$ , the obstruction to the existence of a dotted arrow in this diagram lives in

$$ \begin{align*} \operatorname{\mathrm{Ext}}^1\left(L(\alpha_0\varphi_0)^*L_{\mathcal{X}/k},\alpha_0^*\mathcal{J}_n\right)=\operatorname{\mathrm{Ext}}^1\left(L\varphi_0^*L_{\mathcal{X}/k},\mathcal{O}_{k'}\right)\otimes_{k'}\mathcal{J}_n\otimes_{k'}A. \end{align*} $$

We will show that this group vanishes, and so by [Reference OlssonOls06, Theorem 1.5], the objects (resp., automorphisms) of $\mathcal {Y}_{\xi _n}(A)$ are parametrised by $\operatorname {\mathrm {Ext}}^n\left (L\varphi _0^*L_{\mathcal {X}/k},\mathcal {O}_{k'}\right )\otimes _{k'}\mathcal {J}_n\otimes _{k'}A$ where $n=0$ (resp., $n=-1$ ). In particular, if V (resp., G) denotes the affine space (resp., algebraic vector group) over $k'$ associated to the vector space $\operatorname {\mathrm {Ext}}^n\left (L\varphi _0^*L_{\mathcal {X}/k},\mathcal {O}_{k'}\right )\otimes _{k'}\mathcal {J}_n$ with $n=0$ (resp., $n=-1$ ), then we have

$$ \begin{align*} \mathcal{Y}_{\xi_n}\cong V\times_{k'} G\cong \mathbb{A}^{r\left(\xi_n\right)}\times B\mathbb{G}_a^{j\left(\xi_n\right)}, \end{align*} $$

where $r(\xi _n)=\dim \operatorname {\mathrm {Ext}}^0\left (L\varphi _0^*L_{\mathcal {X}/k},\mathcal {O}_{k'}\right )$ and $j(\xi _n)=\dim \operatorname {\mathrm {Ext}}^1\left (L\varphi _0^*L_{\mathcal {X}/k},\mathcal {O}_{k'}\right )$ . Note that this implies

$$ \begin{align*} e\left(\mathcal{Y}_{\xi_n}\right)=\mathbb{L}^{r\left(\xi_n\right)-j\left(\xi_n\right)}. \end{align*} $$

Therefore, to finish the proof of the theorem, it suffices to show that

(1) $$ \begin{align} \operatorname{\mathrm{Ext}}^1\left(L\varphi_0^*L_{\mathcal{X}/k},\mathcal{O}_{k'}\right)=0,\qquad r(\xi_n)-j(\xi_n)=\dim\mathcal{X}, \end{align} $$

and that the locus of $\varphi _0\in \lvert \mathcal {X}\rvert $ where $r(\xi _n)$ is constant is given by a constructible set. Since these remaining statements depend only on the dimension of the $\operatorname {\mathrm {Ext}}$ -groups over $k'$ , it suffices to replace $k'$ with an extension field, and hence we can assume $k'$ is algebraically closed.

Let $\rho \colon \widetilde {X}\to \mathcal {X}$ be a smooth cover. Since $k'$ is algebraically closed, we may fix a lift $\phi _0\colon \operatorname {\mathrm {Spec}} k'\to \widetilde {X}$ of $\varphi _0$ . Since $\widetilde {X}$ and $\rho $ are smooth, we have an exact triangle

$$ \begin{align*} p^*L_{\mathcal{X}/k}\to\Omega^1_{\widetilde{X}/k}\to\Omega^1_{\widetilde{X}/\mathcal{X}}, \end{align*} $$

from which we obtain an exact triangle

$$ \begin{align*} \Gamma\left(\phi_0^*T_{\widetilde{X}/\mathcal{X}}\right)\to\Gamma\left(\phi_0^*T_{\widetilde{X}/k}\right)\to \mathrm{RHom}\left(L\varphi_0^*L_{\mathcal{X}/k},\mathcal{O}_{k'}\right). \end{align*} $$

In particular, $\operatorname {\mathrm {Ext}}^n\left (L\varphi _0^*L_{\mathcal {X}/k},\mathcal {O}_{k'}\right )=0$ for $n\neq 0,-1$ , and there is an exact sequence

(2) $$ \begin{align} 0\to\operatorname{\mathrm{Ext}}^{-1}\left(L\varphi_0^*L_{\mathcal{X}/k},\mathcal{O}_{k'}\right)\to\Gamma\left(\phi_0^*T_{\widetilde{X}/\mathcal{X}}\right)\to\Gamma\left(\phi_0^*T_{\widetilde{X}/k}\right)\to\operatorname{\mathrm{Ext}}^0\left(L\varphi_0^*L_{\mathcal{X}/k},\mathcal{O}_{k'}\right)\to0. \end{align} $$

Thus,

$$ \begin{align*} r(\xi_n)-j(\xi_n)=\dim\Gamma\left(\phi_0^*T_{\widetilde{X}/k}\right)-\dim\Gamma\left(\phi_0^*T_{\widetilde{X}/\mathcal{X}}\right)= \dim\mathcal{X}, \end{align*} $$

thereby establishing equation (1). Finally, note from formula (2) that the cokernel of $\Gamma \left (\phi _0^*T_{\widetilde {X}/\mathcal {X}}\right )\to \Gamma \left (\phi _0^*T_{\widetilde {X}/k}\right )$ depends only on $\varphi _0$ and not on the choice of lift $\phi _0$ . So the locus of $\varphi _0\in \lvert \mathcal {X}\rvert $ where $r(\xi _n)$ is constant is the image under $\rho $ of the locus of $\phi _0\in \left \lvert \widetilde {X}\right \rvert $ where the dimension is constant. By Chevalley’s theorem for Artin stacks [Reference Hall and RydhHR17, Theorem 5.2], it is therefore enough to show that the locus of such $\phi _0$ is constructible. This follows by applying [Sta21, Lemma 0BDI] to the $2$ -term complex $T_{\widetilde {X}/\mathcal {X}}\to T_{\widetilde {X}/k}$ and using the fact that $\left \lvert \widetilde {X}\right \rvert $ is Noetherian, so that all locally constructible sets are constructible.

Lemma 3.35. Let $\mathcal {Y}$ , $\mathcal {Z}$ and $\mathcal {F}$ be finite-type Artin stacks over k, let $\mathcal {Y} \to \mathcal {Z}$ be a k-morphism and assume that for any field extensions $k'$ of k and any k-morphism $\operatorname {\mathrm {Spec}}(k') \to \mathcal {Z}$ , there exists a $k'$ -isomorphism

$$ \begin{align*} \left(\mathcal{Y} \times_{\mathcal{Z}} \operatorname{\mathrm{Spec}}(k')\right)_{\mathrm{red}} \cong \left(\mathcal{F} \times_{\operatorname{\mathrm{Spec}}(k)} \operatorname{\mathrm{Spec}}(k')\right)_{\mathrm{red}}. \end{align*} $$

Then

$$ \begin{align*} \mathrm{e}(\mathcal{Y}) = \mathrm{e}(\mathcal{F})\mathrm{e}(\mathcal{Z}) \in K_0(\mathbf{Stack}_k). \end{align*} $$

Proof. Because $\mathcal {Z}$ can be stratified by quotient stacks [Reference KreschKre99, Proposition 3.5.9], we may assume that $\mathcal {Z} = [Z / G]$ for some finite-type scheme Z over k with an action by a general linear group G over k. Let $\mathcal {Y}' = \mathcal {Y} \times _{\mathcal {Z}} Z$ . Because $Z \to \mathcal {Z}$ and $\mathcal {Y}' \to \mathcal {Y}$ are G-torsors and G is a special group, [Reference EkedahlEke09, Proposition 1.1(ii)] gives

$$ \begin{align*} \mathrm{e}(Z) &= \mathrm{e}(G)\mathrm{e}(\mathcal{Z}),\\ \mathrm{e}(\mathcal{Y}') &= \mathrm{e}(G)\mathrm{e}(\mathcal{Y}). \end{align*} $$

By the hypotheses on $\mathcal {Y} \to \mathcal {Z}$ , Proposition 2.8 implies that $\mathcal {Y}' \to Z$ is a piecewise trivial fibration with fibre $\mathcal {F}$ , so in particular,

$$ \begin{align*} \mathrm{e}(\mathcal{Y}') = \mathrm{e}(\mathcal{F})\mathrm{e}(Z). \end{align*} $$

Thus,

$$ \begin{align*} \mathrm{e}(G)\mathrm{e}(\mathcal{Y}) = \mathrm{e}(G)\mathrm{e}(\mathcal{F})\mathrm{e}(\mathcal{Z}). \end{align*} $$

Because G is a special group, $\mathrm {e}(G)^{-1} \in K_0(\mathbf {Stack}_k)$ , so we are done.

We may now prove Theorem 3.33.

Proof of Theorem 3.33

By definition, there exist some $n_0 \in \mathbb {N}$ and some constructible subset $\mathcal {C}_{n_0} \subset \left \lvert \mathscr {L}_{n_0}(\mathcal {X})\right \rvert $ such that $\mathcal {C} = \left (\theta _{n_0}\right )^{-1}\left (\mathcal {C}_{n_0}\right )$ . Because $\mathcal {X}$ is smooth, infinitesimal lifting implies that the truncation maps $\theta _n: \lvert \mathscr {L}(\mathcal {X})\rvert \to \lvert \mathscr {L}_n(\mathcal {X})\rvert $ are all surjective, so

$$ \begin{align*} \theta_n(\mathcal{C}) = \begin{cases} \left(\theta^n_{n_0}\right)^{-1}\left(\mathcal{C}_{n_0}\right), & n \geq n_0, \\ \theta^{n_0}_n\left(\mathcal{C}_{n_0}\right), & n < n_0. \end{cases} \end{align*} $$

Thus all $\theta _n(\mathcal {C})$ are constructible – immediately for $n \geq n_0$ , and by Chevalley’s theorem for Artin stacks [Reference Hall and RydhHR17, Theorem 5.2] for $n < n_0$ .

The remainder of the theorem then follows from the fact that Lemma 3.34 and Lemma 3.35 imply that for any $n \geq n_0$ ,

$$ \begin{align*} \mathrm{e}(\theta_n(\mathcal{C})) = \left(\theta^n_{n_0}\right)^{-1}\left(\mathcal{C}_{n_0}\right) = \mathrm{e}\left(\mathcal{C}_{n_0}\right)\mathbb{L}^{\left(n-n_0\right)\dim\mathcal{X}}.\\[-39pt] \end{align*} $$

4 Fibres of the map of arcs

Our goal in this section is to give a combinatorial characterisation of the fibres of $\mathscr {L}(\pi )\colon \mathscr {L}(\mathcal {X})\to \mathscr {L}(X)$ , where $\mathcal {X}$ is a fantastack and $\pi \colon \mathcal {X}\to X$ is its good moduli space map (see Theorem 4.9). We accomplish this goal by first defining the tropicalisation of arcs both for toric varieties and for toric stacks.

4.1 Tropicalising arcs of toric stacks

Given a toric variety $X=\operatorname {\mathrm {Spec}}(k[P])$ , a k-algebra R and an arc $\varphi \in \mathscr {L}\left (\widetilde {X}\right )(R)$ , we denote by $\varphi ^*(p)$ the image of p under , where the latter map is the pullback corresponding to $\varphi $ .

Definition 4.1. If $\sigma $ is a pointed rational cone on a finite-rank lattice N and $k'$ is a field extension of k, we define the tropicalisation map

$$ \begin{align*} \operatorname{\mathrm{trop}}: \mathscr{L}(X_\sigma)(k') \to \operatorname{\mathrm{Hom}}(\sigma^\vee\cap N^*, \mathbb{N} \cup \{\infty\}) \end{align*} $$

by $\operatorname {\mathrm {trop}}(\varphi )(p):=\operatorname {\mathrm {ord}}_t\varphi ^*(p)$ , where $\operatorname {\mathrm {ord}}_t$ denotes the order of vanishing at t.

More generally, if $\left (\sigma ,\nu \colon \widetilde {N}\to N\right )$ is a stacky fan with $\sigma $ a pointed cone and $\mathcal {X}:=\mathcal {X}_{\sigma ,\nu }:=[X_\sigma /G_\nu ]$ is the corresponding toric stack, then we define the tropicalisation map on isomorphism classes of arcs

$$ \begin{align*} \operatorname{\mathrm{trop}}: \overline{\mathscr{L}(\mathcal{X})}(k') \to \operatorname{\mathrm{Hom}}\left(\sigma^\vee\cap \widetilde{N}^*, \mathbb{N} \cup \{\infty\}\right) \end{align*} $$

as follows. If $\psi \in \mathscr {L}(\mathcal {X})(k')$ , then fix a finite field extension $k''$ of $k'$ and a lift $\widetilde {\psi }\in \mathscr {L}(X_\sigma )(k'')$ of $\psi $ . We define $\operatorname {\mathrm {trop}}(\psi ):=\operatorname {\mathrm {trop}}\left (\widetilde {\psi }\right )$ . We show in Lemma 4.4 that this is well defined.

Remark 4.2. Note that we have a natural inclusion

$$ \begin{align*} \sigma\cap N=\operatorname{\mathrm{Hom}}(\sigma^\vee\cap N^*, \mathbb{N})\subset\operatorname{\mathrm{Hom}}(\sigma^\vee\cap N^*, \mathbb{N} \cup \{\infty\}). \end{align*} $$

Lemma 4.3. Let $\Omega $ be any field of characteristic $0$ and let $G=\mathbb {G}_m^r\times \prod _{i=1}^N\mu _{n_i}$ . Then every G-torsor over $\operatorname {\mathrm {Spec}}(\Omega [[t]])$ is isomorphic to the pullback of a G-torsor over $\operatorname {\mathrm {Spec}}(\Omega )$ .

Proof. Let $q\colon \operatorname {\mathrm {Spec}}(\Omega [[t]])\to \operatorname {\mathrm {Spec}}(\Omega )$ denote the structure map. Since G is an étale group scheme, G-torsors on any $\Omega $ -scheme Y are classified up to isomorphism by $H^1_{et}(Y,G)=H^1_{et}(Y,\mathbb {G}_m)^{\oplus r}\oplus \bigoplus _{i=1}^N H^1_{et}\left (Y,\mu _{n_i}\right )$ . In particular, it suffices to show that the pullback map $q^*\colon H^1_{et}(\operatorname {\mathrm {Spec}}(\Omega ),G)\to H^1_{et}(\operatorname {\mathrm {Spec}}(\Omega [[t]]),G)$ is an isomorphism when G is either $\mathbb {G}_m$ or $\mu _n$ .

We first handle the case $G=\mathbb {G}_m$ . Since $H^1_{et}(Y,\mathbb {G}_m)=\mathrm {Pic}(Y)$ and since both $\mathrm {Pic}(\operatorname {\mathrm {Spec}}(\Omega ))$ and $\mathrm {Pic}(\operatorname {\mathrm {Spec}}(\Omega [[t]]))$ are trivial, we see that $q^*$ is an isomorphism.

We next handle the case $G=\mu _n$ . From the Kummer sequence

$$ \begin{align*} 1\to\mu_n\to\mathbb{G}_m\xrightarrow{\times n}\mathbb{G}_m\to1, \end{align*} $$

we see that if Y is any $\Omega $ -scheme with trivial Picard group, we have

$$ \begin{align*} H^1_{et}(Y,\mu_n)=\mathcal{O}_Y(Y)^*/(\mathcal{O}_Y(Y)^*)^n \end{align*} $$

(see, for example, [Reference MilneMil80, p. 125]). So it remains to show that $k^*/(k^*)^n\to k[[t]]^*/(k[[t]]^*)^n$ is an isomorphism. Since every element $f(t)\in k[[t]]^*$ can be written uniquely as $ag(t)$ with $a\in k^*$ and $g(t)\in k[[t]]^*$ with $g(t)-1\in tk[[t]]$ , it is enough to prove that such $g(t)$ are in $(k[[t]]^*)^n$ . This follows immediately from Hensel’s lemma: the polynomial $P(x)=x^n-g(t)\in k[[t]][x]$ has a root, since $P(1)=0$ mod t and $P'(1)\neq 0$ mod t.

Lemma 4.4. With notation as in Definition 4.1, such a lift $\widetilde {\psi }$ exists, and $\operatorname {\mathrm {trop}}(\psi )$ is independent of both $k''$ and $\widetilde {\psi }$ .

Proof. For ease of notation, write $F:=\sigma ^\vee \cap \widetilde {N}^*$ and $G:=G_\nu =\operatorname {\mathrm {Spec}}(k[A])$ , where A is a finitely generated abelian group. Note that the G-action on $X_\sigma $ corresponds to a monoid map $\eta \colon F\to A$ . The arc $\psi $ corresponds to a G-torsor and G-equivariant map $Q\to X_\sigma $ . By Lemma 4.3, Q is isomorphic to the pullback of a G-torsor over $\operatorname {\mathrm {Spec}}(k')$ , which can be itself be trivialised after a finite field extension $k''$ . Thus, after base change to , we obtain a trivialisation of Q and hence a lift $\widetilde {\psi }$ .

Next, it is clear that if $\widetilde {\psi }\in \mathscr {L}(X_\sigma )(k'')$ is a lift of $\psi $ and $k'''$ is a finite field extension of $k''$ , then $\operatorname {\mathrm {trop}}\left (\widetilde {\psi }\right )=\operatorname {\mathrm {trop}}\left (\widetilde {\psi }\otimes _{k''}k'''\right )$ . So it suffices to show that if $\widetilde {\psi }_1,\widetilde {\psi }_2\in \mathscr {L}(X_\sigma )(k'')$ are both lifts of $\psi $ , then $\operatorname {\mathrm {trop}}\left (\widetilde {\psi }_1\right )=\operatorname {\mathrm {trop}}\left (\widetilde {\psi }_2\right )$ . In this case, there exists such that $g\cdot \widetilde {\psi }_1=\widetilde {\psi }_2$ . Letting $g^*(a)$ denote the pullback of $a\in A$ under the map , we therefore have

$$ \begin{align*} g^*(\eta(f))\psi_1^*(f)=\psi_2^*(f). \end{align*} $$

Since $g^*(\eta (f))$ is a unit, the power series $\psi _1^*(f)$ and $\psi _2^*(f)$ have the same t-order of vanishing – that is, $\operatorname {\mathrm {trop}}\left (\widetilde {\psi }_1\right )=\operatorname {\mathrm {trop}}\left (\widetilde {\psi }_2\right )$ .

We record some basic properties of $\operatorname {\mathrm {trop}}$ that will be useful later on.

Definition 4.5. Let $\left (\sigma ,\nu \colon \widetilde {N}\to N\right )$ be a stacky fan with $\sigma $ a pointed cone. For any $w \in \sigma \cap \widetilde {N} \subset \operatorname {\mathrm {Hom}}\left (\sigma ^\vee \cap \widetilde {N}^*, \mathbb {N} \cup \{\infty \}\right )$ , let

$$ \begin{align*} \operatorname{\mathrm{trop}}^{-1}(w)=\left\{ \psi\in\overline{\mathscr{L}\left(\mathcal{X}_{\sigma,\nu}\right)}(k') \mid k' \text{is a field extension of } k \text{ and }\operatorname{\mathrm{trop}}(\psi)=w\right\}\subset\left\lvert\mathscr{L}\left(\mathcal{X}_{\sigma,\nu}\right)\right\rvert ,\\[-15pt] \end{align*} $$

where the arcs are taken up to equivalence.

Remark 4.6. Let $\sigma $ be a pointed rational cone on a finite-rank lattice N and let $P=\sigma ^\vee \cap N^*$ so that $X_\sigma =\operatorname {\mathrm {Spec}}(k[P])$ . For any $p\in P$ , let $\chi ^p\in k[P]$ be the corresponding monomial. If $p_1, \dotsc , p_s$ are generators for P, then for every $w \in \sigma \cap N$ , we see

$$ \begin{align*} \operatorname{\mathrm{trop}}^{-1}(w) = \bigcap_{i = 1}^s \operatorname{\mathrm{ord}}_{\chi^{p_i}}^{-1}(\langle w, p_i \rangle),\\[-15pt] \end{align*} $$

and hence $\operatorname {\mathrm {trop}}^{-1}(w) \subset \mathscr {L}(X_\sigma )$ is a cylinder.

Lemma 4.7. Let $\sigma $ (resp., $\widetilde {\sigma }$ ) be a pointed rational cone on a finite-rank lattice N (resp., $\widetilde {N}$ ). If $\rho \colon X_{\widetilde {\sigma }}\to X_{\sigma }$ is a toric morphism and $\beta \colon \widetilde {\sigma }\cap \widetilde {N}\to \sigma \cap N$ is the induced map, then

  1. 1. for every field extension $k'$ of k and every arc $\psi \in \mathscr {L}\left (X_{\widetilde {\sigma }}\right )(k')$ , if $\operatorname {\mathrm {trop}}(\psi )\in \widetilde \sigma ^\vee \cap \widetilde {N}^*$ , then

    $$ \begin{align*} \operatorname{\mathrm{trop}}(\mathscr{L}(\rho)(\psi))=\beta(\operatorname{\mathrm{trop}}(\psi));\\[-15pt] \end{align*} $$
  2. 2. if for all $f\in \widetilde {\sigma }^\vee \cap \widetilde {N}^*$ there exists $f'\in \widetilde {\sigma }^\vee \cap \widetilde {N}^*$ such that $f+f'$ lies in the image of $\sigma ^\vee \cap N^*$ , then

    $$ \begin{align*} \mathscr{L}(\rho)^{-1}\left(\operatorname{\mathrm{trop}}^{-1}(w)\right)=\bigcup_{\widetilde{w} \in \beta^{-1}(w)} \operatorname{\mathrm{trop}}^{-1}\left(\widetilde{w}\right). \end{align*} $$

Proof. Let $\rho ^*\colon \sigma ^\vee \cap N^*\to \widetilde \sigma ^\vee \cap \widetilde {N}^*$ denote the pullback map on monoids. First note that if $k'$ is a field extension of k, $\psi \in \mathscr {L}\left (X_{\widetilde {\sigma }}\right )(k')$ and $p\in \sigma ^\vee \cap N^*$ , then

$$ \begin{align*} \operatorname{\mathrm{trop}}(\mathscr{L}(\rho)(\psi))(p)=\operatorname{\mathrm{ord}}_t(\psi^*\rho^*(p))=(\operatorname{\mathrm{trop}}(\psi))(\rho^*(p)). \end{align*} $$

To prove part (1), let $\operatorname {\mathrm {trop}}(\psi )=\widetilde {w}\in \widetilde \sigma ^\vee \cap \widetilde {N}^*$ . Then by these equalities, we see

$$ \begin{align*} \operatorname{\mathrm{trop}}(\mathscr{L}(\rho)(\psi))(p)=\langle\widetilde{w},\rho^*(p)\rangle=\langle\beta(\widetilde{w}),p\rangle, \end{align*} $$

so $\operatorname {\mathrm {trop}}(\mathscr {L}(\rho )(\psi ))=\beta (\widetilde {w})$ .

Part (2) follows immediately from part (1), provided we can show that $\operatorname {\mathrm {trop}}(\mathscr {L}(\rho )(\psi ))\in \sigma \cap N$ implies $\operatorname {\mathrm {trop}}(\psi )\in \widetilde \sigma \cap \widetilde {N}$ . Set $f\in \widetilde {\sigma }^\vee \cap \widetilde {N}^*$ . By hypothesis, there exists $f'\in \widetilde {\sigma }^\vee \cap \widetilde {N}^*$ such that $f+f'=\rho ^*(p)$ for some $p\sigma ^\vee \cap N^*$ . Then

$$ \begin{align*} (\operatorname{\mathrm{trop}}(\psi))(f)+(\operatorname{\mathrm{trop}}(\psi))(f')=(\operatorname{\mathrm{trop}}(\psi))(\rho^*(p))=\operatorname{\mathrm{trop}}(\mathscr{L}(\rho)(\psi))(p)\neq\infty. \end{align*} $$

So $(\operatorname {\mathrm {trop}}(\psi ))(f)\neq \infty $ for all f, and hence $\operatorname {\mathrm {trop}}(\psi )\in \widetilde \sigma \cap \widetilde {N}$ .

Corollary 4.8. Let $\mathcal {X}=\mathcal {F}_{\sigma ,\nu }$ be a fantastack and suppose the good moduli space map $\pi \colon \mathcal {X}\to X=X_\sigma $ is an isomorphism over the torus $T\subset X$ . Let $k'$ be a field extension of k and $\varphi \in \mathscr {L}(X)(k')$ with $\operatorname {\mathrm {trop}}(\varphi )=w\in \sigma \cap N$ . If $\psi \in \mathscr {L}(\mathcal {X})(k')$ and $\mathscr {L}(\pi )(\psi )=\varphi $ , then $\operatorname {\mathrm {trop}}(\psi ) \in \beta ^{-1}(w)$ .

Proof. We keep the notation listed in Notation 2.19 and let $\mathcal {X}=\left [\widetilde {X}/G_\nu \right ]$ . We know there exist a finite field extension $k''$ of $k'$ and a lift $\widetilde {\psi }\in \mathscr {L}\left (\widetilde {X}\right )(k'')$ of $\psi $ . By construction, $\operatorname {\mathrm {trop}}(\psi )=\operatorname {\mathrm {trop}}\left (\widetilde {\psi }\right )$ . From Proposition 2.14, we know the hypotheses of Lemma 4.7(2) are satisfied, so $\operatorname {\mathrm {trop}}\left (\widetilde {\psi }\right )\in \beta ^{-1}(w)$ .

4.2 Lifting arcs to a fantastack

We can now state the main result of this section, which shows that for the good moduli space map $\pi \colon \mathcal {X}\to X$ of a fantastack, isomorphism classes of arcs in the fibres of $\mathscr {L}(\pi )$ are completely determined by their tropicalisations.

Theorem 4.9. Let $\mathcal {X}=\mathcal {F}_{\sigma ,\nu }$ be a fantastack and assume the good moduli space map $\pi \colon \mathcal {X}\to X:=X_\sigma $ is an isomorphism over the torus $T\subset X$ . With the notation listed in Notation 2.19, let $k'$ be a field extension of k and $\varphi \in \mathscr {L}(X)(k')$ with $\operatorname {\mathrm {trop}}(\varphi ) = w\in \sigma \cap N$ . Then

$$ \begin{align*} \operatorname{\mathrm{trop}}: \overline{\mathscr{L}(\mathcal{X})}(k') \to \operatorname{\mathrm{Hom}}(F, \mathbb{N} \cup \{\infty\}) \end{align*} $$

induces, by restriction, a bijection

$$ \begin{align*} \overline{\left(\mathscr{L}(\pi)^{-1}(\varphi)\right)}(k') \to \beta^{-1}(w). \end{align*} $$

In particular, $\overline {\left (\mathscr {L}(\pi )^{-1}(\varphi )\right )}(k')$ is a finite set.

For the rest of this section, we fix the notation as in the statement of Theorem Theorem 4.9. By Corollary 4.8, we know that any $\psi \in \mathscr {L}(\mathcal {X})(k')$ with $(\mathscr {L}(\pi ))(\psi ) = \varphi $ must satisfy $\operatorname {\mathrm {trop}}(\psi ) \in \beta ^{-1}(w)$ . We therefore have an induced map $\overline {\left (\mathscr {L}(\pi )^{-1}(\varphi )\right )}(k') \to \beta ^{-1}(w)$ . We show injectivity and surjectivity in Proposition 4.10 and Proposition 4.11, respectively. Note that the finiteness of $\overline {\left (\mathscr {L}(\pi )^{-1}(\varphi )\right )}(k')$ then follows from Proposition 2.15.

Proposition 4.10. The restriction of the map

$$ \begin{align*} \operatorname{\mathrm{trop}}: \overline{\mathscr{L}(\mathcal{X})}(k') \to \operatorname{\mathrm{Hom}}(F, \mathbb{N} \cup \{\infty\}) \end{align*} $$

to $\overline {\left (\mathscr {L}(\pi )^{-1}(\varphi )\right )}(k')$ is injective.

Proof. Let $\psi _1, \psi _2 \in \mathscr {L}(\mathcal {X})(k')$ correspond to G-torsors and G-equivariant maps $\gamma _1: Q_1 \to \widetilde {X}$ and $\gamma _2: Q_2 \to \widetilde {X}$ , respectively, and assume that $\mathscr {L}(\pi )(\psi _1) = \mathscr {L}(\pi )(\psi _2) = \varphi $ and $\operatorname {\mathrm {trop}}(\psi _1) = \operatorname {\mathrm {trop}}(\psi _2)$ . We need to prove that $\psi _1$ and $\psi _2$ are isomorphic – that is, that there exists an isomorphism of G-torsors $\alpha : Q_1 \to Q_2$ such that $\gamma _1 = \gamma _2 \circ \alpha $ . In fact, we prove the stronger statement that there exists a unique such $\alpha $ .

To prove this stronger statement, by descent, it is enough to show the existence of a unique such $\alpha $ étale locally on . By Lemma 4.3, the $Q_i$ are isomorphic to pullbacks of torsors over $k'$ , which can themselves be trivialised after base change to a finite field extension $k''$ of $k'$ . Since , after replacing $k'$ by $k''$ , we may therefore assume that the $Q_i$ are trivial G-torsors. Since $\operatorname {\mathrm {trop}}(\psi _i)$ depends only on the isomorphism class of $\psi _i$ , we may further assume .

Next, the identity section of the G-torsor $Q_i$ then yields a lift $\widetilde {\psi }_i\in \mathscr {L}\left (\widetilde {X}\right )(k')$ of $\psi _i$ . Then the map

satisfies

where $u^{\overline {f}} \in k[A]$ is the monomial indexed by the image $\overline {f}$ of f in A. Since $\operatorname {\mathrm {trop}}\left (\widetilde {\psi }_i\right )=\operatorname {\mathrm {trop}}(\psi _i)$ , we see $\operatorname {\mathrm {trop}}\left (\widetilde {\psi }_1\right )=\operatorname {\mathrm {trop}}\left (\widetilde {\psi }_2\right )\in \widetilde {\sigma } \cap \widetilde {N}$ . Thus, for all $f \in F$ , the power series $\widetilde {\psi }_1^*(f)$ and $\widetilde {\psi }_2^*(f)$ are nonzero and have the same t-order of vanishing. It follows that there is a unique unit

such that

$$ \begin{align*} \psi_1^*(f) = g^{(f)} \psi_2^*(f). \end{align*} $$

Since $\mathscr {L}(\pi )\left (\widetilde \psi _1\right ) = \mathscr {L}(\pi )\left (\widetilde \psi _2\right )$ , we see that $\widetilde \psi _1^*(p) = \widetilde \psi _2^*(p)$ , and so $g^{(p)} = 1$ for all $p \in P$ .

Thus the semigroup homomorphism induces a group homomorphism , which corresponds to an element and hence an automorphism $\alpha $ of the G-torsor . By construction, $\widetilde {\psi _1} = \widetilde {\psi _2} \circ \alpha $ , and so $\gamma _1 = \gamma _2 \circ \alpha $ . Moreover, the uniqueness of $\alpha $ follows from the uniqueness of each $g^{(f)}$ .

We now complete the proof of Theorem 4.9 by showing the surjectivity of the map $\overline {\left (\mathscr {L}(\pi )^{-1}(\varphi )\right )}(k') \to \beta ^{-1}(w)$ .

Proposition 4.11. The image of $\overline {\left (\mathscr {L}(\pi )^{-1}(\varphi )\right )}(k')$ under the map

$$ \begin{align*} \operatorname{\mathrm{trop}}: \overline{\mathscr{L}(\mathcal{X})}(k') \to \operatorname{\mathrm{Hom}}(F, \mathbb{N} \cup \{\infty\}) \end{align*} $$

is equal to $\beta ^{-1}(w)$ .

Proof. Recall that in Corollary 4.8, we proved that the image of $\overline {\left (\mathscr {L}(\pi )^{-1}(\varphi )\right )}(k')$ under $\operatorname {\mathrm {trop}}$ is contained in $\beta ^{-1}(w)$ .

Set $\widetilde {w} \in \beta ^{-1}(w)$ . We will construct an arc $\psi \in \mathscr {L}(\mathcal {X})(k')$ satisfying $\operatorname {\mathrm {trop}}(\psi ) = \widetilde {w}$ and $\mathscr {L}(\pi )(\psi ) = \varphi $ . Let be the generic point of $\varphi $ – that is, $\eta $ is the composition . Since $w \in \sigma \cap N$ , we see that $\eta $ factors through $T \hookrightarrow X$ . Thus $\eta $ is given by a group homomorphism .

Given our inclusion $M\hookrightarrow \widetilde {M}$ , we can choose a $\mathbb {Z}$ -basis $f_1, \dotsc , f_r$ for $\widetilde {M} = F^{\mathrm {gp}}$ and $m_1, \dotsc , m_d \in \mathbb {Z}_{>0}$ such that $m_1 f_1, \dotsc , m_d f_d$ is a $\mathbb {Z}$ -basis for M. Since $\operatorname {\mathrm {trop}}(\varphi ) = w$ , the image of $m_i f_i$ under has t-order of vanishing $\langle w, m_i f_i \rangle $ , so it can be written as $t^{\left \langle w, m_i f_i \right \rangle } g_i$ with .

Now set R to be the

-algebra

and give $\operatorname {\mathrm {Spec}}(R)$ the G-action obtained by letting $x_i$ have grading $\overline {f}_i$ , where $\overline {f}_i$ is the image of $f_i$ in A. Since each $g_i$ is a unit in

, we see that

is a G-torsor.

Let $\psi \in \mathscr {L}(\mathcal {X})(k')$ be the arc corresponding to the G-torsor $\operatorname {\mathrm {Spec}}(R)$ and the G-equivariant map $\operatorname {\mathrm {Spec}}(R) \to \widetilde {X} = \operatorname {\mathrm {Spec}}(k[F])$ defined by

$$ \begin{align*} F \to R: f \mapsto t^{\left\langle \widetilde{w}, f \right\rangle} \prod_{i=1}^r x_i^{c_i}, \end{align*} $$

for $f = \sum _{i=1}^r c_i f_i$ and $c_1, \dotsc , c_r \in \mathbb {Z}$ . Note that this map is well defined, since $\langle \widetilde {w}, f \rangle \geq 0$ when $f \in F$ , and each $x_i$ is a unit in R as a consequence of the fact that each $g_i$ is a unit in . Note further that since the $x_i$ are units, the map sends f to an element whose t-order of vanishing is $\langle \widetilde {w},f\rangle $ . As a result, any lift $\widetilde {\psi }\in \mathscr {L}\left (\widetilde {X}\right )(k'')$ obtained from a trivialisation of the G-torsor after base change to $k''$ , satisfies $\operatorname {\mathrm {trop}}(\psi )=\operatorname {\mathrm {trop}}\left (\widetilde {\psi }\right )=\widetilde {w}$ .

To finish the proof, we must show $\mathscr {L}(\pi )(\psi ) = \varphi $ – that is, $\pi \circ \psi =\varphi $ . Since X is separated, it is enough to prove equality after precomposing by the generic point . But this follows from the facts that $\eta =\varphi \circ \xi $ and that for any $i \in \{1, \dotsc , d\}$ , the image of $m_i f_i$ under the pullback of $\operatorname {\mathrm {Spec}}(R) \to \widetilde {X} \xrightarrow {\widetilde {\pi }} X$ is equal to

$$ \begin{align*} t^{\left\langle \widetilde{w}, m_i f_i \right\rangle} x_i^{m_i} = t^{\left\langle w, m_i f_i \right\rangle} g_i.\\[-39pt] \end{align*} $$

5 Fibres of the maps of jets

Throughout this section set $d \in \mathbb {N}$ , let $N \cong \mathbb {Z}^d$ be a lattice, let $T = \operatorname {\mathrm {Spec}}(k[N^*])$ be the algebraic torus with cocharacter lattice N, let $\sigma $ be a pointed rational cone in $N_{\mathbb {R}}$ , let X be the affine T-toric variety associated to $\sigma $ , let $\mathcal {X}$ be the canonical stack over X and let $\pi : \mathcal {X} \to X$ be the canonical map.

In this section we will control the fibres of the maps

$$ \begin{align*} \mathscr{L}_n(\pi): \mathscr{L}_n(\mathcal{X}) \to \mathscr{L}_n(X) \end{align*} $$

in the case where $\sigma $ is d-dimensional. In particular, we will prove the following:

Theorem 5.1. Suppose that $\sigma $ is d-dimensional, and set $w \in \sigma \cap N$ . Then there exist $n_w \in \mathbb {N}$ and $\Theta _w \in K_0(\mathbf {Stack}_k)$ and a sequence of finite-type Artin stacks $\{\mathcal {F}_n\}_{n \geq n_w}$ over k such that

  1. 1. for each $n \geq n_w$ ,

    $$ \begin{align*} \mathrm{e}(\mathcal{F}_n) = \Theta_w \in K_0(\mathbf{Stack}_k), \end{align*} $$
    and
  2. 2. for each field extension $k'$ of k, each arc $\varphi \in \mathscr {L}(X)(k')$ with $\operatorname {\mathrm {trop}}(\varphi ) = w$ and each $n \geq n_w$ , we have

    $$ \begin{align*} \mathscr{L}_n(\pi)^{-1}(\theta_n(\varphi))_{\mathrm{red}} \cong \mathcal{F}_n \otimes_k k'. \end{align*} $$

For the remainder of this section, we will assume that $\sigma $ is d-dimensional, and we will use the notation listed in Notation 2.19.

5.1 Algebraic groups and jets

We begin by introducing some algebraic groups, which in Proposition 5.15 will be used to express the fibres of each $\mathscr {L}_n(\pi )$ .

Remark 5.2. In what follows, for each k-algebra R, each $g_n \in \mathscr {L}_n\left (\widetilde {T}\right )(R)$ and each $f \in \widetilde {M}$ , let $g_n^*(f) \in \left (R[t]/\left (t^{n+1}\right )\right )^\times $ denote the image of f under the pullback map $ k\left [\widetilde {M}\right ] \to R[t]/\left (t^{n+1}\right )$ corresponding to the jet $g_n: \operatorname {\mathrm {Spec}}\left (R[t]/\left (t^{n+1}\right )\right ) \to \widetilde {T}$ . We also use the analogous notation when T and M are in place of $\widetilde {T}$ and $\widetilde {M}$ .

For each $w \in \sigma \cap N$ and $n \in \mathbb {N}$ , let $G_n^w$ be the subgroup object of $\mathscr {L}_n\left (\widetilde {T}\right )$ given by

$$ \begin{align*} G_n^w(R) = \left\{ g_n \in \mathscr{L}_n\left(\widetilde{T}\right)(R) \mid g_n^*(p)t^{\left\langle w, p \right\rangle} = t^{\left\langle w, p \right\rangle} \in R[t]/\left(t^{n+1}\right)\text{ for all }p \in P\right\}. \end{align*} $$

For each $\widetilde {w} \in \widetilde {\sigma } \cap \widetilde {N}$ and $n \in \mathbb {N}$ , let $H_n^{\widetilde {w}}$ be the subgroup object of $\mathscr {L}_n\left (\widetilde {T}\right )$ given by

$$ \begin{align*} H_n^{\widetilde{w}}(R) = \left\{ g_n \in \mathscr{L}_n\left(\widetilde{T}\right)(R) \mid g_n^*(f) t^{\left\langle \widetilde{w}, f \right\rangle} = t^{\left\langle \widetilde{w}, f \right\rangle} \in R[t]/\left(t^{n+1}\right)\text{ for all }f \in F\right\}. \end{align*} $$

By definition, $H_n^{\widetilde {w}}$ is a subgroup object of $G_n^{\beta \left (\widetilde {w}\right )}$ . We now show that these group objects are in fact algebraic groups.

Proposition 5.3. The subgroup objects $G_n^w$ and $H_n^{\widetilde {w}}$ are represented by closed subgroups of $\mathscr {L}_n\left (\widetilde {T}\right )$ .

Proof. For each $f \in F$ , let $\mathscr {L}_n(f): \mathscr {L}_n\left (\widetilde {T}\right ) \to \mathscr {L}_n(\mathbb {G}_m)$ be the map induced by the character $\widetilde {T} \to \mathbb {G}_m$ corresponding to f. Then

$$ \begin{align*} G_n^w = \bigcap_{p \in P} \left(\theta^n_{n-\left\langle w, p \right\rangle} \circ \mathscr{L}_n(p)\right)^{-1}(1) \end{align*} $$

and

$$ \begin{align*} H_n^{\widetilde{w}} = \bigcap_{f \in F} \left(\theta^n_{n-\left\langle \widetilde{w}, f \right\rangle} \circ \mathscr{L}_n(f)\right)^{-1}(1), \end{align*} $$

where each $\theta _{n-n'}^n: \mathscr {L}_{n}(\mathbb {G}_m) \to \mathscr {L}_{n-n'}(\mathbb {G}_m)$ is the truncation morphism, each $1 \in \mathscr {L}_{n-n'}(\mathbb {G}_m)$ is the identity element and, by convention, if $n-n' < 0$ , we set $\mathscr {L}_{n-n'}(\mathbb {G}_m)$ to be the single point group $\{1\}$ .

Remark 5.4. Note that

$$ \begin{align*} \mathscr{L}_n(G)(R) = \left\{g_n \in \mathscr{L}_n\left(\widetilde{T}\right)(R) \mid g_n^*(p) = 1 \in R[t]/\left(t^{n+1}\right)\text{ for all }p \in P\right\}, \end{align*} $$

so for any $n \in \mathbb {N}$ and $w \in \sigma \cap N$ , we have that $\mathscr {L}_n(G)$ is a closed subgroup of $G_n^w$ .

We also prove the following characterisation of the $H_n^{\widetilde {w}}$ :

Proposition 5.5. Set $\widetilde {w} \in \widetilde {\sigma } \cap \widetilde {N}$ and $n \in \mathbb {N}$ , and let $f_1, \dotsc , f_r$ be the minimal generators of F. If $n \geq \max _{i=1}^r\left ( 2\left \langle \widetilde {w}, f_i\right \rangle - 1\right )$ , then

$$ \begin{align*} H_n^{\widetilde{w}} \cong \mathbb{G}_a^{\sum_{i = 1}^r \left\langle \widetilde{w}, f_i \right\rangle} \end{align*} $$

as algebraic groups.

Proof. Let R be a k-algebra. Then

$$ \begin{align*} H_n^{\widetilde{w}}(R) &= \left\{ g_n \in \mathscr{L}_n\left(\widetilde{T}\right)(R) \mid g_n^*(f)t^{\left\langle \widetilde{w}, f \right\rangle} = t^{\left\langle \widetilde{w}, f \right\rangle} \in R[t]/\left(t^{n+1}\right)\text{ for all }f \in F\right\} \\ &=\left\{ g_n \in \mathscr{L}_n\left(\widetilde{T}\right)(R) \mid g_n^*(f_i)t^{\left\langle \widetilde{w}, f_i \right\rangle} = t^{\left\langle \widetilde{w}, f_i \right\rangle} \in R[t]/\left(t^{n+1}\right)\text{ for all }i = 1, \dotsc, r\right\}\\ &\cong \left\{ \left(g^{(i)}\right)_i \in \left(\left(R[t]\left(t^{n+1}\right)\right)^\times\right)^r \mid g^{(i)} t^{\left\langle \widetilde{w}, f_i \right\rangle} = t^{\left\langle \widetilde{w}, f_i \right\rangle} \in R[t]/\left(t^{n+1}\right)\text{ for all }i\right\}. \end{align*} $$

Since $n \geq 0$ , the hypotheses guarantee that $n \geq \langle \widetilde {w}, f_i \rangle $ for all $i \in \{1, \dotsc , r\}$ . Thus if $i \in \{1, \dotsc , r\}$ and $g^{(i)} \in \left (R[t]/\left (t^{n+1}\right )\right )^\times $ , then

$$ \begin{align*} g^{(i)}t^{\left\langle \widetilde{w}, f_i \right\rangle} = t^{\left\langle \widetilde{w}, f_i \right\rangle} \in R[t]/\left(t^{n+1}\right) \end{align*} $$

if and only if

$$ \begin{align*} g^{(i)} = 1 + a_{n-\left\langle \widetilde{w}, f_i \right\rangle + 1} t^{n-\left\langle \widetilde{w}, f_i \right\rangle+1} + \dotsb + a_{n} t^n \in R[t]/\left(t^{n+1}\right) \end{align*} $$

for some $a_{n-\left \langle \widetilde {w}, f_i \right \rangle + 1}, \dotsc , a_n \in R$ . The proposition thus follows from the fact that if $a_{n-\left \langle \widetilde {w}, f_i \right \rangle +1}, \dotsc , a_n$ , $b_{n-\left \langle \widetilde {w}, f_i \right \rangle +1}, \dotsc , b_n \in R$ , then in $R[t]/\left (t^{n+1}\right )$ ,

$$ \begin{align*} &\left(1 + a_{n-\left\langle \widetilde{w}, f_i \right\rangle+1} t^{n-\left\langle \widetilde{w}, f_i \right\rangle+1} + \dotsb + a_n t^n\right) \left(1 + b_{n-\left\langle \widetilde{w}, f_i \right\rangle+1} t^{n-\left\langle \widetilde{w}, f_i \right\rangle+1} + \dotsb + b_n t^n\right) \\ &\qquad\qquad\quad\qquad\qquad\qquad\qquad = 1 + \left(a_{n-\left\langle \widetilde{w}, f_i \right\rangle+1}+b_{n-\left\langle \widetilde{w}, f_i \right\rangle+1}\right) t^{n-\left\langle \widetilde{w}, f_i \right\rangle+1} + \dotsb + (a_n+b_n) t^n, \end{align*} $$

because for any $m_1, m_2 \geq n-\langle \widetilde {w}, f_i \rangle +1$ , we have

$$ \begin{align*} m_1+m_2 \geq 2n-2\langle \widetilde{w}, f_i \rangle+2 = 2n+1 - (2\langle \widetilde{w}, f_i \rangle-1) \geq n+1.\\[-36pt] \end{align*} $$

We finish this subsection with the next two propositions, which characterise the group quotients $G_n^w / \mathscr {L}_n(G)$ .

Proposition 5.6. Set $w \in \sigma \cap N$ and $n \in \mathbb {N}$ . Then the group quotient $G_n^w / \mathscr {L}_n(G)$ has functor of points given by

$$ \begin{align*} R \mapsto \left\{h_n \in \mathscr{L}_n(T)(R) \mid h_n^*(p) t^{\left\langle w, p \right\rangle} = t^{\left\langle w, p \right\rangle} \in R[t]/\left(t^{n+1}\right)\text{ for all }p \in P\right\}. \end{align*} $$

Proof. First, the subgroup object is represented by a closed subgroup of $\mathscr {L}_n(T)$ by an identical argument as in Proposition 5.3. Call this closed subgroup $H \subset \mathscr {L}_n(T)$ . We will show that $G_n^w / \mathscr {L}_n(G) \cong H$ as schemes.

By the definition of H and $G_n^w$ , the closed subgroup $G_n^w \subset \mathscr {L}_n\left (\widetilde {T}\right )$ is equal to the preimage of H under the group homomorphism $\mathscr {L}_n\left (\widetilde {T}\right ) \to \mathscr {L}_n(T)$ obtained by applying the functor $\mathscr {L}_n$ to the group homomorphism $\widetilde {\pi }\rvert _{\widetilde {T}}: \widetilde {T} \to T$ . Thus we obtain a group homomorphism $G_n^w \to H$ . Endow H with the $G_n^w$ -action obtained by left multiplication after $G_n^w \to H$ .

For any k-algebra R and $g_n \in G_n^w(R)$ , we have that $g_n \in \mathscr {L}_n(G)(R)$ if and only if $g_n^*(p) = 1$ for all $p \in P$ , which is equivalent to $g_n$ being in the kernel of $G_n^w \to H$ . Therefore the scheme-theoretic stabiliser of the identity $1 \in H(k)$ is equal to $\mathscr {L}_n(G)$ . Thus by [Reference Demazure and GabrielDG70, Chapter III, Section 3, Proposition 5.2], we have a locally closed embedding

$$ \begin{align*} G_n^w/\mathscr{L}_n(G) \hookrightarrow H \end{align*} $$

whose image, as a set, is equal to the image of the map of underlying sets $G_n^w \to H$ . Since k has characteristic $0$ so that H is reduced, we only need to show that $G_n^w \to H$ is surjective on underlying sets, which will follow if we can show that $\mathscr {L}_n\left (\widetilde {T}\right ) \to \mathscr {L}_n(T)$ is surjective on underlying sets. The latter follows immediately from Corollary 3.22, which implies that $\mathscr {L}_n\left (\widetilde {T}\right ) \to \mathscr {L}_n(T)$ is a $\mathscr {L}_n(G)$ -torsor.

Proposition 5.7. Set $w \in \sigma \cap N$ . Then there exist $n^{\prime }_w, j^{\prime }_w \in \mathbb {N}$ such that for all $n \geq n^{\prime }_w$ , we have an isomorphism of schemes

$$ \begin{align*} G_n^w / \mathscr{L}_n(G) \cong \mathbb{A}^{j^{\prime}_w}_k. \end{align*} $$

Proof. Let $p_1, \dotsc , p_s$ be a set of generators of the semigroup P and set

$$ \begin{align*} n^{\prime}_w = \max_{1\leq i\leq s}( 2 \langle w, p_i \rangle - 1) \end{align*} $$

and $m = \max _{1\leq i\leq s} \langle w, p_i \rangle $ . Consider the affine space $\mathbb {A}_k^{ms}$ with coordinates $\left (x^{(i)}_\ell \right )_{i \in \left \{1, \dotsc , s\right \}, \ell \in \left \{1, \dotsc , m\right \}}$ . Let V be the linear subspace of $\mathbb {A}_k^{ms}$ defined by the vanishing of all $x^{(i)}_\ell $ for $\ell> \langle w, p_i \rangle $ and the vanishing of all $\sum _{i =1}^s m_i x^{(i)}_\ell $ for all $\ell \in \{1, \dotsc , m\}$ and all $m_1, \dotsc , m_s \in \mathbb {Z}$ such that

$$ \begin{align*} \sum_{i =1}^s m_i p_i = 0 \in P^{\mathrm{gp}} = M. \end{align*} $$

Set $j^{\prime }_w = \dim V$ . It suffices to show that for all $n \geq n^{\prime }_w$ , we have that $G_n^w / \mathscr {L}_n(G) \cong V$ as schemes.

Let $n \geq n^{\prime }_w$ and let H be the closed subgroup of $\mathscr {L}_n(T)$ representing the subgroup object in the statement of Proposition 5.6. By Proposition 5.6, it is sufficient to prove that $H \cong V$ as schemes.

Let $H \to \mathbb {A}^{ms}_k$ be the morphism that, for each k-algebra R, takes $h_n \in H(R)$ to $\left (a^{(i)}_{n-\ell +1}\right )_{i,\ell } \in R^{ms} = \mathbb {A}^{ms}_k(R)$ , where for all $i,\ell $ we have that $a^{(i)}_{n-\ell +1}$ is the coefficient of $t^{n-\ell +1}$ in $p_i(h_n) \in R[t]/\left (t^{n+1}\right )$ . This morphism $H \to \mathbb {A}_k^{ms}$ factors through an isomorphism $H \xrightarrow {\sim } V$ by the definition of H, the construction of V and the fact that $n \geq n^{\prime }_w$ implies that for any k-algebra R, any $m_1, \dotsc , m_s \in \mathbb {Z}$ and any $\left (a^{(i)}_{n-\ell +1}\right )_{i,\ell } \in R^{ms}$ , we have that

$$ \begin{align*} \prod_{i = 1}^s &\left( 1 + a^{(i)}_{n-m+1} t^{n-m+1} + \dotsb + a^{(i)}_n t^n \right)^{m_i} \\ &\qquad\qquad\qquad\qquad = 1 + \left( \sum_{i = 1}^s m_i a^{(i)}_{n-m+1} \right) t^{n-m+1} + \dotsb + \left( \sum_{i = 1}^s m_i a^{(i)}_{n} \right) t^{n} \in R[t]/\left(t^{n+1}\right).\\[-48pt] \end{align*} $$

5.2 Components of the fibres

In this subsection, we will control fibres of each $\mathscr {L}_n(\pi ): \mathcal {X} \to X$ by controlling the connected components of the fibres of each map $\mathscr {L}_n\left (\widetilde {\pi }\right ): \mathscr {L}_n\left (\widetilde {X}\right ) \to \mathscr {L}_n(X)$ . In particular, we will show that for n sufficiently large and $\varphi \in \mathscr {L}(X)$ with $\operatorname {\mathrm {trop}}(\varphi )=w \in \sigma \cap N$ , the connected components of $\mathscr {L}_n\left (\widetilde {\pi }\right )^{-1}(\theta _n(\varphi ))$ are indexed by $\beta ^{-1}(w)$ . To do this, we will define analogues of the map $\operatorname {\mathrm {trop}}$ for the jet schemes $\mathscr {L}_n\left (\widetilde {X}\right )$ .

For any $n \in \mathbb {N}$ , let $\mathbb {N}_n = \{0, 1, \dotsc , n, \infty \}$ with the monoid structure making

$$ \begin{align*} \mathbb{N} \cup \{\infty\} \to \mathbb{N}_n: \ell \mapsto \begin{cases} \ell, & \ell \leq n, \\ \infty, &\ell> n \end{cases} \end{align*} $$

a map of monoids. For any $\widetilde {w} \in \operatorname {\mathrm {Hom}}(F, \mathbb {N} \cup \{\infty \})$ , let $\widetilde {w}_n \in \operatorname {\mathrm {Hom}}(F, \mathbb {N}_n)$ be the composition of $\widetilde {w}: F \to \mathbb {N} \cup \{\infty \}$ with $\mathbb {N} \cup \{\infty \} \to \mathbb {N}_n$ .

Remark 5.8. In what follows, for each k-algebra R, each $\widetilde {\psi }_n \in \mathscr {L}_n\left (\widetilde {X}\right )(R)$ and each $f \in F$ , let $\widetilde {\psi }_n^*(f) \in R[t]/\left (t^{n+1}\right )$ denote the image of f under the pullback map $ k[F] \to R[t]/\left (t^{n+1}\right )$ corresponding to the jet $\widetilde {\psi }_n: \operatorname {\mathrm {Spec}}\left (R[t]/\left (t^{n+1}\right )\right ) \to \widetilde {X}$ . We use the analogous notation when X and P are in place of $\widetilde {X}$ and F.

For any field extension $k'$ of k and $\widetilde {\psi }_n \in \mathscr {L}_n\left (\widetilde {X}\right )(k')$ , define

$$ \begin{align*} \operatorname{\mathrm{trop}}_n\left(\widetilde{\psi}_n\right) \in \operatorname{\mathrm{Hom}}(F, \mathbb{N}_n) \end{align*} $$

to be the map taking each $f \in F$ to the t-order of vanishing of $\widetilde {\psi }_n^*(f) \in k'[t]/\left (t^{n+1}\right )$ . Also define the map

$$ \begin{align*} \operatorname{\mathrm{trop}}_n: \mathscr{L}_n\left(\widetilde{X}\right) \to \operatorname{\mathrm{Hom}}(F, \mathbb{N}_n) \end{align*} $$

by considering each $\widetilde {\psi }_n \in \mathscr {L}\left (\widetilde {X}\right )$ as a point valued in its residue field.

Remark 5.9. As a direct consequence of the definition, $\operatorname {\mathrm {trop}}_n$ is compatible with field extensions. In other words, for any field extension $k'$ of k and $\widetilde {\psi }_n \in \mathscr {L}_n\left (\widetilde {X}\right )(k')$ , we have that $\operatorname {\mathrm {trop}}_n\left (\widetilde {\psi }_n\right )$ is equal to $\operatorname {\mathrm {trop}}_n$ applied to the image of $\widetilde {\psi }_n$ in the underlying set of $\mathscr {L}_n\left (\widetilde {X}\right )$ .

Remark 5.10. For any $\widetilde {\psi } \in \mathscr {L}\left (\widetilde {X}\right )(k')$ ,

$$ \begin{align*} \left(\operatorname{\mathrm{trop}}\left(\widetilde{\psi}\right)\right)_n = \operatorname{\mathrm{trop}}_n\left(\theta_n\left(\widetilde{\psi}\right)\right). \end{align*} $$

Note that because $\widetilde {X}$ is an affine space and thus is smooth, all jets of $\widetilde {X}$ are truncations of arcs of $\widetilde {X}$ , so this equality in fact determines $\operatorname {\mathrm {trop}}_n$ .

We next stratify the fibre of $\mathscr {L}_n\left (\widetilde {\pi }\right )$ according to the value of $\operatorname {\mathrm {trop}}_n$ . We show that for n sufficiently large, each stratum is a union of connected components.

Lemma 5.11. For each $f \in F$ , the map

$$ \begin{align*} \mathscr{L}_n\left(\widetilde{X}\right) \to \mathbb{N}_n: \widetilde{\psi}_n \mapsto \left(\operatorname{\mathrm{trop}}_n\left(\widetilde{\psi}_n\right)\right)(f) \end{align*} $$

is upper semicontinuous.

Proof. Since $\widetilde {X}$ is affine, $\mathscr {L}_n\left (\widetilde {X}\right ) = \operatorname {\mathrm {Spec}}(R)$ for some k-algebra R. Let $\Psi $ be the universal family of $\mathscr {L}_n\left (\widetilde {X}\right )$ – that is, let

$$ \begin{align*} \Psi: \operatorname{\mathrm{Spec}}\left(R[t]/\left(t^{n+1}\right)\right) \to \widetilde{X} \end{align*} $$

be the R-valued jet corresponding to the identity $\operatorname {\mathrm {Spec}}(R) = \mathscr {L}_n\left (\widetilde {X}\right )$ , and let $\Psi ^*(f) \in R[t]/\left (t^{n+1}\right )$ be the result of pulling back f along $\Psi $ . Write

$$ \begin{align*} \Psi^*(f) = a_0 + \dotsb + a_n t^n, \end{align*} $$

where $a_0, \dotsc , a_n \in R$ . Then the jets $\widetilde {\psi }_n \in \mathscr {L}_n\left (\widetilde {X}\right )$ with $\left (\operatorname {\mathrm {trop}}_n\left (\widetilde {\psi }_n\right )\right )(f) \geq \ell $ are exactly the points of $\operatorname {\mathrm {Spec}}(R)$ where $a_0, \dotsc , a_{\ell -1}$ vanish.

Proposition 5.12. Set $w \in \sigma \cap N$ . Then there exists some $n_0 \in \mathbb {N}$ such that for any $n \geq n_0$ , any field extension $k'$ of k and any $\varphi \in \mathscr {L}(X)(k')$ with $\operatorname {\mathrm {trop}}(\varphi ) =w$ , we have that the restriction of $\operatorname {\mathrm {trop}}_n: \mathscr {L}_n\left (\widetilde {X}\right ) \to \operatorname {\mathrm {Hom}}(F, \mathbb {N}_n)$ to the fibre $\mathscr {L}_n\left (\widetilde {\pi }\right )^{-1}(\theta _n(\varphi ))$ is locally constant.

Proof. Set $f \in F$ . We will show that there exists some $n_f \in \mathbb {N}$ such that for any $n \geq n_f$ , any field extension $k'$ of k and any $\varphi \in \mathscr {L}(X)(k')$ with $\operatorname {\mathrm {trop}}(\varphi ) =w$ , we have that the restriction of

$$ \begin{align*} \mathscr{L}_n\left(\widetilde{X}\right) \to \mathbb{N}_n : \widetilde{\psi}_n \mapsto \left(\operatorname{\mathrm{trop}}_n\left(\widetilde{\psi}_n\right)\right)(f) \end{align*} $$

to the fibre $\mathscr {L}_n\left (\widetilde {\pi }\right )^{-1}(\theta _n(\varphi ))$ is locally constant.

By Proposition 2.14, there exists some $f' \in F$ such that $f + f' \in P$ . Set

$$ \begin{align*} n_f = \langle w, f + f' \rangle. \end{align*} $$

Let $n \geq n_f$ , let $k'$ be a field extension of k and let $\varphi \in \mathscr {L}(X)(k')$ with $\operatorname {\mathrm {trop}}(\varphi )=w$ . Since $\mathscr {L}_n\left (\widetilde {\pi }\right ): \mathscr {L}_n\left (\widetilde {X}\right ) \to \mathscr {L}_n(X)$ is finite type, it is sufficient to show that on any irreducible component C of the fibre $\mathscr {L}_n\left (\widetilde {\pi }\right )^{-1}(\theta _n(\varphi ))$ , the map

$$ \begin{align*} \alpha: C \to \mathbb{N}_n : \widetilde{\psi}_n \mapsto \left(\operatorname{\mathrm{trop}}_n\left(\widetilde{\psi}_n\right)\right)(f) \end{align*} $$

is constant. By Lemma 5.11, $\alpha $ and the map

$$ \begin{align*} \gamma: C \to \mathbb{N}_n: \widetilde{\psi}_n \mapsto \left(\operatorname{\mathrm{trop}}_n\left(\widetilde{\psi}_n\right)\right)(f') \end{align*} $$

are upper semicontinuous. Also, for all $\widetilde {\psi }_n \in C$ ,

$$ \begin{align*} \alpha\left(\widetilde{\psi}_n\right) + \gamma\left(\widetilde{\psi}_n\right) = \left(\operatorname{\mathrm{trop}}_n\left(\widetilde{\psi}_n\right)\right)(f + f') = \langle w, f + f'\rangle_n, \end{align*} $$

where $\langle w, f + f'\rangle _n$ is the image of $\langle w, f+f'\rangle $ in $\mathbb {N}_n$ . Thus the sum of $\alpha $ and $\gamma $ is a constant function. Furthermore, because $n \geq \langle w, f + f' \rangle $ , the sum of $\alpha $ and $\gamma $ is not equal to $\infty $ . Therefore, $\alpha $ is constant by upper semicontinuity of $\alpha $ and $\gamma $ and the fact that C is irreducible.

Now the proposition is obtained by taking $n_0$ to be larger than all $n_f$ as f vary over the minimal generators of F.

For any $n \in \mathbb {N}$ , any $\widetilde {w} \in \widetilde {\sigma } \cap \widetilde {N}$ , any field extension $k'$ of k and any $\varphi \in \mathscr {L}(X)(k')$ , let $C_n^{\widetilde {w}}(\varphi )$ denote the locus in $\mathscr {L}_n\left (\widetilde {\pi }\right )^{-1}(\theta _n(\varphi ))$ where $\operatorname {\mathrm {trop}}_n$ is equal to $\widetilde {w}_n$ . We will be interested in the case where $C_n^{\widetilde {w}}(\varphi )$ is a union of connected components of $\mathscr {L}_n\left (\widetilde {\pi }\right )^{-1}(\theta _n(\varphi ))$ . In that case, we will give $C_n^{\widetilde {w}}(\varphi )$ its reduced scheme structure.

Proposition 5.13. Set $w \in \sigma \cap N$ . Then there exists some $n_1 \in \mathbb {N}$ such that for any $n \geq n_1$ , any field extension $k'$ of k, any $\varphi \in \mathscr {L}(X)(k')$ with $\operatorname {\mathrm {trop}}(\varphi ) = w$ and any $\widetilde {w} \in \beta ^{-1}(w)$ ,

  1. 1. $C_n^{\widetilde {w}}(\varphi )$ is a union of connected components of $\mathscr {L}_n\left (\widetilde {\pi }\right )^{-1}(\theta _n(\varphi ))$ , and we have an isomorphism of schemes

    $$ \begin{align*} \mathscr{L}_n\left(\widetilde{\pi}\right)^{-1}(\theta_n(\varphi))_{\mathrm{red}} \cong \bigsqcup_{\widetilde{w}' \in \beta^{-1}(w)} C_n^{\widetilde{w}'}(\varphi); \end{align*} $$
  2. 2. $C_n^{\widetilde {w}}(\varphi )$ is invariant under the action of $G_n^w \otimes _k k'$ on $\mathscr {L}_n\left (\widetilde {X}\right ) \otimes _k k'$ ;

  3. 3. for each field extension $k''$ of $k'$ , the action of $\left (G_n^w \otimes _k k'\right )(k'')$ on $C_n^{\widetilde {w}}(\varphi )(k'')$ is transitive; and

  4. 4. for each field extension $k''$ of $k'$ , the scheme-theoretic stabiliser of any $k''$ -point of $C_n^{\widetilde {w}}(\varphi )$ under the $G_n^w \otimes _k k'$ -action is equal to $H_n^{\widetilde {w}} \otimes _k k''$ .

Remark 5.14. In the statement of Proposition 5.13, the action of $G_n^w$ on $\mathscr {L}_n\left (\widetilde {X}\right )$ is the one induced by the inclusion $G_n^w \hookrightarrow \widetilde {T}$ and the functor $\mathscr {L}_n$ applied to the toric action $\widetilde {T} \times _k \widetilde {X} \to \widetilde {X}$ .

Proof. Let $f_1, \dotsc , f_r$ be the minimal generators of F, and let $p_1, \dotsc , p_s$ be a set of generators for the semigroup P. Let $n_0 \in \mathbb {N}$ be as in the statement of Proposition 5.12, and let $n_1 \geq n_0$ be such that $n_1 \geq \langle w, p_i \rangle $ for all $i \in \{1, \dotsc , s\}$ and $n_1 \geq \langle \widetilde {w}, f_i \rangle $ for all $i \in \{1, \dotsc , r\}$ and $\widetilde {w} \in \beta ^{-1}(w)$ . Note that we can choose such an $n_1$ by Proposition 2.15.

Let $n \geq n_1$ , let $k'$ be a field extension of k and set $\varphi \in \mathscr {L}(X)(k')$ with $\operatorname {\mathrm {trop}}(\varphi )= w$ . We begin by proving the first part of the proposition.

  1. 1. By our choice of $n_0$ and Proposition 5.12, $C_n^{\widetilde {w}}(\varphi )$ is a union of connected components of $\mathscr {L}_n\left (\widetilde {\pi }\right )^{-1}(\theta _n(\varphi ))$ , so it suffices to prove that $\mathscr {L}_n\left (\widetilde {\pi }\right )^{-1}(\theta _n(\varphi ))$ and $\bigsqcup _{\widetilde {w}' \in \beta ^{-1}(w)} C_n^{\widetilde {w}'}(\varphi )$ are equal as sets.

    Set $\widetilde {w} \in \widetilde {\sigma } \cap \widetilde {N}$ . We first show that if $C_n^{\widetilde {w}}\neq \emptyset $ , then $\widetilde {w} \in \beta ^{-1}(w)$ . If $\widetilde {\psi }_n \in \mathscr {L}_n\left (\widetilde {\pi }\right )^{-1}(\theta _n(\varphi ))$ , then for all $i \in \{1, \dotsc , s\}$ ,

    $$ \begin{align*} \left(\operatorname{\mathrm{trop}}_n\left(\widetilde{\psi}_n\right)\right)(p_i) = \langle w, p_i \rangle_n, \end{align*} $$
    where $\langle w, p_i \rangle _n$ is the image of $\langle w, p_i \rangle $ in $\mathbb {N}_n$ . Since $n \geq n_1 \geq \langle w, p_i \rangle $ , this implies that if $\widetilde {\psi }_n \in C_n^{\widetilde {w}}$ , then $\left \langle \widetilde {w}, p_i \right \rangle = \langle w, p_i \rangle $ for all $i \in \{1, \dotsc , s\}$ , and so $\beta \left (\widetilde {w}\right ) = w$ .

    Having shown $C_n^{\widetilde {w}}(\varphi )=\emptyset $ whenever $\widetilde {w} \notin \beta ^{-1}(w)$ , we need only show that if $\widetilde {w}_1, \widetilde {w}_2$ are distinct elements of $\beta ^{-1}(w)$ ; then $\left (\widetilde {w}_1\right )_n \neq \left (\widetilde {w}_2\right )_n$ . This follows from the fact that for each $i \in \{1, \dotsc , r\}$ and $\widetilde {w} \in \beta ^{-1}(w)$ ,

    $$ \begin{align*} \left\langle \widetilde{w}, f_i \right\rangle \leq n_1 \leq n. \end{align*} $$

For the rest of this proof, set $\widetilde {w} \in \beta ^{-1}(w)$ and set the following notation: for each field extension $k''$ of $k'$ , let $\varphi _{n, k''} \in \mathscr {L}_n(X)(k'')$ be the composition

$$ \begin{align*} \operatorname{\mathrm{Spec}}\left(k''[t]/\left(t^{n+1}\right)\right) \to \operatorname{\mathrm{Spec}}\left(k'[t]/\left(t^{n+1}\right)\right) \xrightarrow{\theta_n\left(\varphi\right)} X, \end{align*} $$

where the map $\operatorname {\mathrm {Spec}}\left (k''[t]/t^{n+1}\right ) \to \operatorname {\mathrm {Spec}}\left (k'[t]/t^{n+1}\right )$ is given by the $k'$ -algebra map $k'[t]/\left (t^{n+1}\right ) \to k''[t]/\left (t^{n+1}\right ): t \mapsto t$ . Note that the $k''$ -points of $C_n^{\widetilde {w}}(\varphi )$ are precisely those $\widetilde {\psi }_n: \operatorname {\mathrm {Spec}}\left (k''[t]/\left (t^{n+1}\right )\right ) \to \widetilde {X}$ such that $\operatorname {\mathrm {trop}}_n\left (\widetilde {\psi }_n\right ) = \widetilde {w}_n$ and the composition $ \operatorname {\mathrm {Spec}}\left (k''[t]/\left (t^{n+1}\right )\right ) \xrightarrow {\widetilde {\psi }_n} \widetilde {X} \to X$ is equal to $\varphi _{n,k''}$ . We now prove the remaining parts of the proposition.

  1. 2. Since $C_n^{\widetilde {w}}(\varphi )$ is reduced by definition, it suffices to show that for each field extension $k''$ of $k'$ , we have that $C_n^{\widetilde {w}}(\varphi )(k'')$ is invariant under the action of $G_n^w(k'')$ on $\mathscr {L}_n\left (\widetilde {X}\right )(k'')$ .

    Let $k''$ be a field extension of $k'$ , set $\widetilde {\psi }_n \in C_n^{\widetilde {w}}(\varphi )(k'')$ and set $g_n \in G_n^w(k'')$ . Then for all $f \in F$ ,

    $$ \begin{align*} \left(g_n \cdot \widetilde{\psi}_n\right)^*(f) = g_n^*(f) \widetilde{\psi}_n^*(f) \end{align*} $$
    has the same t-order of vanishing as $\widetilde {\psi }_n^*(f)$ , because $g_n^*(f) \in k''[t]/\left (t^{n+1}\right )$ is a unit. Thus
    $$ \begin{align*} \operatorname{\mathrm{trop}}_n\left(g_n \cdot \widetilde{\psi}_n\right) = \operatorname{\mathrm{trop}}_n\left(\widetilde{\psi}_n\right) = \widetilde{w}_n. \end{align*} $$
    We also have that for all $p \in P$ ,
    $$ \begin{align*} \left(g_n \cdot \widetilde{\psi}_n\right)^*(p) = g_n^*(p) \widetilde{\psi}_n^*(p) = g_n^*(p) \varphi_{n,k''}^*(p) = \varphi_{n,k''}^*(p), \end{align*} $$
    where the last equality follows from the definition of $G_n^w$ and the fact that $\operatorname {\mathrm {trop}}(\varphi ) = w$ implies that $\varphi _{n,k''}^*(p)$ is divisible by $t^{\left \langle w, p \right \rangle }$ . Therefore the composition $\operatorname {\mathrm {Spec}}\left (k''[t]/\left (t^{n+1}\right )\right ) \xrightarrow {g_n \cdot \widetilde {\psi }_n} \widetilde {X} \to X$ is equal to $\varphi _{n,k''}$ . Thus
    $$ \begin{align*} g_n \cdot \widetilde{\psi}_n \in C_n^{\widetilde{w}}(\varphi)(k''). \end{align*} $$
  2. 3. Let $k''$ be a field extension of $k'$ , and set $\widetilde {\psi }_n, \widetilde {\psi }^{\prime }_n \in C_n^{\widetilde {w}}(\varphi )(k'')$ . We will first show that there exists some $g_n \in \mathscr {L}_n\left (\widetilde {T}\right )(k'')$ such that $g_n \cdot \widetilde {\psi }_n = \widetilde {\psi }^{\prime }_n$ .

    Let $f_1, \dotsc , f_r$ be the minimal generators of F. For each $i \in \{1, \dotsc , r\}$ , we have that $\widetilde {\psi }_n^*(f_i)$ and $\left (\widetilde {\psi }^{\prime }_n\right )^*(f_i)$ have the same t-order of vanishing because $\operatorname {\mathrm {trop}}_n\left (\widetilde {\psi }_n\right ) = \widetilde {w} = \operatorname {\mathrm {trop}}_n\left (\widetilde {\psi }^{\prime }_n\right )$ . Thus there exists a unit $g^{(i)} \in k[t]/\left (t^{n+1}\right )$ such that

    $$ \begin{align*} g^{(i)} \widetilde{\psi}_n^*(f_i) = \left(\widetilde{\psi}^{\prime}_n\right)^*(f_i). \end{align*} $$
    Letting $g_n \in \mathscr {L}_n\left (\widetilde {T}\right )(k'')$ be such that $g_n^*(f_i) = g^{(i)}$ for all $i \in \{1, \dotsc , r\}$ ,
    $$ \begin{align*} g_n \cdot \widetilde{\psi}_n = \widetilde{\psi}^{\prime}_n. \end{align*} $$

    Now it suffices to show that if $g_n \in \mathscr {L}_n\left (\widetilde {T}\right )(k'')$ and $\widetilde {\psi }_n$ , $g_n \cdot \widetilde {\psi }_n \in C_n^{\widetilde {w}}(\varphi )(k'')$ , then $g_n \in G_n^w(k'')$ . For all $p \in P$ ,

    $$ \begin{align*} g_n^*(p) \varphi_{n,k''}^*(p) = g_n^*(p) \widetilde{\psi}_n^*(p) = \left(g_n \cdot \widetilde{\psi}_n\right)^*(p) = \varphi_{n,k''}^*(p), \end{align*} $$
    so because $\varphi _{n,k''}^*(p)$ is a unit multiple of $t^{\left \langle w, p \right \rangle }$ , we have that $g_n \in G_n^w(k'')$ by definition.
  3. 4. Let $k''$ be a field extension of $k'$ , set $\widetilde {\psi }_n \in C_n^{\widetilde {w}}(\varphi )(k'')$ , and for any $k''$ -algebra R, let $\widetilde {\psi }_{n,R} \in C_n^{\widetilde {w}}(\varphi )(R)$ be the composition

    $$ \begin{align*} \operatorname{\mathrm{Spec}}\left(R[t]/\left(t^{n+1}\right)\right) \to \operatorname{\mathrm{Spec}}(k''[t]/(t^{n+1})) \xrightarrow{\widetilde{\psi}_n} \widetilde{X}. \end{align*} $$
    Set $g_n \in G_n^w(R)$ . Then for each $f \in F$ , we have that $\widetilde {\psi }_{n,R}^*(f) \in R[t]/\left (t^{n+1}\right )$ is the product of a unit in $k''[t]/\left (t^{n+1}\right )$ and $t^{\left \langle \widetilde {w}, f\right \rangle }$ , so
    $$ \begin{align*} g_n^*(f) \widetilde{\psi}_{n,R}^*(f) = \widetilde{\psi}_{n,R}^*(f) \iff g_n^*(f)t^{\left\langle \widetilde{w}, f\right\rangle} = t^{\left\langle \widetilde{w}, f\right\rangle}. \end{align*} $$
    Therefore $g_n$ is in the stabiliser of $\widetilde {\psi }_n$ if and only if $g_n \in H_n^{\widetilde {w}}(R)$ .

In the next proposition, we use Theorem 4.9 and Proposition 5.13 to control the reduced fibres of each $\mathscr {L}_n(\pi ): \mathscr {L}_n(\mathcal {X}) \to \mathscr {L}_n(X)$ .

Proposition 5.15. Set $w \in \sigma \cap N$ . Then there exists some $n_2 \in \mathbb {N}$ such that for any $n \geq n_2$ , any field extension $k'$ of k and any $\varphi \in \mathscr {L}(X)(k')$ with $\operatorname {\mathrm {trop}}(\varphi ) = w$ , we have

$$ \begin{align*} \mathscr{L}_n(\pi)^{-1}(\theta_n(\varphi))_{\mathrm{red}} \cong \left(\bigsqcup_{\widetilde{w} \in \beta^{-1}(w)} \left[\left(G_n^w/\mathscr{L}_n(G)\right) / H_n^{\widetilde{w}}\right]\right) \otimes_k k', \end{align*} $$

where $H_n^{\widetilde {w}}$ acts on $G_n^w/\mathscr {L}_n(G)$ via the group homomorphism $H_n^{\widetilde {w}} \hookrightarrow G_n^w \to G_n^w/\mathscr {L}_n(G)$ and left multiplication.

Proof. Let $f_1, \dotsc , f_r$ be the minimal generators of F. Let $n_1$ be as in the statement of Proposition 5.13, and let $n_2 \geq n_1$ be such that $n_2 \geq \max _{i=1}^r\left ( 2\left \langle \widetilde {w}, f_i\right \rangle - 1\right )$ for all $\widetilde {w} \in \beta ^{-1}(w)$ . Note that we can choose such an $n_2$ by Proposition 2.15.

Let $n \geq n_2$ , let $k'$ be a field extension of k and let $\varphi \in \mathscr {L}(X)(k')$ be such that $\operatorname {\mathrm {trop}}(\varphi ) = w$ . By Corollary 3.22, there exists an isomorphism $\mathscr {L}_n(\mathcal {X}) \xrightarrow {\sim } \left [\mathscr {L}_n\left (\widetilde {X}\right ) / \mathscr {L}_n(G)\right ]$ such that the following diagram commutes:

Therefore

$$ \begin{align*} \mathscr{L}_n(\pi)^{-1}(\theta_n(\varphi)) \cong \left[\mathscr{L}_n\left(\widetilde{\pi}\right)^{-1}(\theta_n(\varphi)) / (\mathscr{L}_n(G) \otimes_k k')\right], \end{align*} $$

where $\mathscr {L}_n(G) \otimes _k k'$ acts on $\mathscr {L}_n\left (\widetilde {\pi }\right )^{-1}(\theta _n(\varphi ))$ by restriction of its action on $\mathscr {L}_n\left (\widetilde {X}\right ) \otimes _k k'$ , which itself is the action induced by the inclusion $\mathscr {L}_n(G) \hookrightarrow \mathscr {L}_n\left (\widetilde {T}\right )$ and the functor $\mathscr {L}_n$ applied to the toric action $\widetilde {T} \times _k \widetilde {X} \to \widetilde {X}$ . Thus by Remark 5.4 and Remark 5.14, the action of $\mathscr {L}_n(G) \otimes _k k'$ on $\mathscr {L}_n\left (\widetilde {\pi }\right )^{-1}(\theta _n(\varphi ))$ is the restriction of the action on $\mathscr {L}_n\left (\widetilde {X}\right ) \otimes _k k'$ induced by the inclusion $\mathscr {L}_n(G) \otimes _k k' \hookrightarrow G_n^w \otimes _k k'$ and the action of $G_n^w \otimes _k k'$ on $\mathscr {L}_n\left (\widetilde {X}\right ) \otimes _k k'$ . Thus Proposition 5.13(2) implies that for all $\widetilde {w} \in \beta ^{-1}(w)$ , we have that $C_n^{\widetilde {w}}(\varphi )$ is invariant under the $\mathscr {L}_n(G) \otimes _k k'$ action, so by Proposition 5.13(1),

$$ \begin{align*} \mathscr{L}_n(\pi)^{-1}(\theta_n(\varphi))_{\mathrm{red}} \cong \bigsqcup_{\widetilde{w} \in \beta^{-1}(w)} \left[C_n^{\widetilde{w}}(\varphi) / (\mathscr{L}_n(G) \otimes_k k') \right]. \end{align*} $$

Set $\widetilde {w} \in \beta ^{-1}(w)$ . It will be sufficient to prove that

$$ \begin{align*} \left[C_n^{\widetilde{w}}(\varphi) / (\mathscr{L}_n(G) \otimes_k k') \right] \cong \left[\left(G_n^w/\mathscr{L}_n(G)\right) / H_n^{\widetilde{w}}\right] \otimes_k k'. \end{align*} $$

We begin by establishing that $C_n^{\widetilde {w}}(\varphi ) / (\mathscr {L}_n(G') \otimes _k k')$ is an affine scheme with a $k'$ -point. Since G is a diagonalisable group scheme, we have $G\cong T' \times _k G'$ , where $T'$ is a torus and $G'$ is a finite group. This yields an identification

$$ \begin{align*} \mathscr{L}_n(G) \otimes_k k' \cong (\mathscr{L}_n(T') \times_k \mathscr{L}_n(G')) \otimes_k k'. \end{align*} $$

Note that $\mathscr {L}_n(G')\cong G'$ , since $G'$ is a finite group. By Proposition 5.5, our choice of $n_2$ and the fact that k has characteristic $0$ , we then see

$$ \begin{align*} \{1\}=\mathscr{L}_n(G') \cap H_n^{\widetilde{w}} \subset G_n^w. \end{align*} $$

Thus Proposition 5.13(4) implies that $\mathscr {L}_n(G') \otimes _k k'$ acts freely on $C_n^{\widetilde {w}}(\varphi )$ . Note that $C_n^{\widetilde {w}}(\varphi )$ is affine because $\mathscr {L}_n\left (\widetilde {X}\right )$ and $\mathscr {L}_n(X)$ are affine, so

$$ \begin{align*} C_n^{\widetilde{w}}(\varphi) / (\mathscr{L}_n(G') \otimes_k k')\longrightarrow \left[C_n^{\widetilde{w}}(\varphi) / (\mathscr{L}_n(G) \otimes_k k') \right] \end{align*} $$

is an $(\mathscr {L}_n(T') \otimes _k k')$ -torsor and the source is an affine scheme. By Theorem 4.9, there exists some $\psi \in \left (\mathscr {L}(\pi )^{-1}(\varphi )\right )(k')$ with $\operatorname {\mathrm {trop}}(\psi ) = \widetilde {w}$ , so

$$ \begin{align*} \theta_n(\psi) \in \left[C_n^{\widetilde{w}}(\varphi) / (\mathscr{L}_n(G) \otimes_k k') \right](k'). \end{align*} $$

Since $\mathscr {L}_n(T')$ is a special group by Remark 2.4, $\theta _n(\psi )$ lifts to a $k'$ -point of $C_n^{\widetilde {w}}(\varphi ) / (\mathscr {L}_n(G') \otimes _k k')$ .

Next, by Proposition 5.13(2)–(4), the group $\left (G_n^w / \mathscr {L}_n(G')\right ) \otimes _k k'$ acts transitively on $C_n^{\widetilde {w}}(\varphi ) / (\mathscr {L}_n(G') \otimes _k k')$ , and each $k'$ -point has stabiliser $\left (H_n^{\widetilde {w}} / \left (H_n^{\widetilde {w}} \cap \mathscr {L}_n(G')\right ) \right) \otimes _k k'$ , so [Reference Demazure and GabrielDG70, Chapter III, Section 3, Proposition 5.2] gives an $(\mathscr {L}_n(T') \otimes _k k')$ -equivariant isomorphism

$$ \begin{align*} C_n^{\widetilde{w}}(\varphi) / (\mathscr{L}_n(G') \otimes_k k') &\cong \left( C_n^{\widetilde{w}}(\varphi) / (\mathscr{L}_n(G') \otimes_k k') \right)_{\mathrm{red}} \\ &\cong \left( \left(G_n^w / \mathscr{L}_n(G')\right)/\left( H_n^{\widetilde{w}} / \left(H_n^{\widetilde{w}} \cap \mathscr{L}_n(G')\right)\right) \right)\otimes_k k'\\ &\cong \left[\left(G_n^w / H_n^{\widetilde{w}}\right) / \mathscr{L}_n(G')\right] \otimes_k k', \end{align*} $$

where the last isomorphism holds because $\mathscr {L}_n(G') \cap H_n^{\widetilde {w}} = \{1\}$ . Taking the quotient by $\mathscr {L}_n(T') \otimes _k k'$ , we obtain

$$ \begin{align*} \left[C_n^{\widetilde{w}}(\varphi) / (\mathscr{L}_n(G) \otimes_k k') \right] \cong \left[\left(G_n^w / H_n^{\widetilde{w}}\right) / \mathscr{L}_n(G)\right] \otimes_k k' \cong \left[\left(G_n^w/\mathscr{L}_n(G)\right) / H_n^{\widetilde{w}}\right] \otimes_k k'.\\[-36pt] \end{align*} $$

We may now complete the proof of Theorem 5.1.

Proof of Theorem 5.1

Set $w \in \sigma \cap N$ , let $f_1, \dotsc , f_r$ be the minimal generators of F, let $n^{\prime }_w$ and $j^{\prime }_w$ be as in the statement of Proposition 5.7 and let $n_2$ be as in the statement of Proposition 5.15. Recalling that $\beta ^{-1}(w)$ is a finite set by Proposition 2.15, set

$$ \begin{align*} n_w = \max \left\{ n^{\prime}_w, n_2, 2 \left\langle \widetilde{w}, f_i \right\rangle - 1 \mid i \in \{1, \dotsc, r\}, \widetilde{w} \in \beta^{-1}(w) \right\} \end{align*} $$

and

$$ \begin{align*} \Theta_w = \sum_{\widetilde{w} \in \beta^{-1}(w)} \mathbb{L}^{j^{\prime}_w - \sum_{i=1}^r \left\langle \widetilde{w}, f_i \right\rangle} \in K_0(\mathbf{Stack}_k), \end{align*} $$

and for each $n \geq n_w$ , set

$$ \begin{align*} \mathcal{F}_n = \bigsqcup_{\widetilde{w} \in \beta^{-1}(w)} \left[\left(G_n^w/\mathscr{L}_n(G)\right) / H_n^{\widetilde{w}}\right]. \end{align*} $$

We now finish proving each part of Theorem 5.1 separately.

  1. 1. For all $n \geq n_w$ ,

    $$ \begin{align*} \mathrm{e}(\mathcal{F}_n) &= \sum_{\widetilde{w} \in \beta^{-1}(w)} \mathrm{e}\left.\left(\left[(G_n^w/\mathscr{L}_n(G)\right) / H_n^{\widetilde{w}}\right]\right)\\ &= \sum_{\widetilde{w} \in \beta^{-1}(w)} \mathrm{e}\left(G_n^w / \mathscr{L}_n(G)\right) \mathbb{L}^{-\sum_{i=1}^r \left\langle \widetilde{w}, f_i \right\rangle} = \sum_{\widetilde{w} \in \beta^{-1}(w)} \mathbb{L}^{j^{\prime}_w - \sum_{i=1}^r \left\langle \widetilde{w}, f_i \right\rangle} = \Theta_w, \end{align*} $$
    where the second equality follows from Proposition 5.5 and the fact that $\mathbb {G}_a$ is a special group, and the third equality follows from Proposition 5.7.
  2. 2. This is Proposition 5.15 – that is, it follows from our choice of $n_2$ and each $\mathcal {F}_n$ .

6 Gorenstein measure and toric varieties

Set $d \in \mathbb {N}$ , let $N \cong \mathbb {Z}^d$ be a lattice, let $T = \operatorname {\mathrm {Spec}}(k[N^*])$ be the algebraic torus with cocharacter lattice N, let $\sigma $ be a pointed rational cone in $N_{\mathbb {R}}$ and let X be the affine T-toric variety associated to $\sigma $ . We assume that X is $\mathbb {Q}$ -Gorenstein and let $m \in \mathbb {Z}_{>0}$ and $q \in N^*$ be such that if v is the first lattice point of any ray of $\sigma $ ,

$$ \begin{align*} \langle v, q \rangle = m. \end{align*} $$

Then $mK_X$ is Cartier, so we have the ideal sheaf $\mathscr {J}_{X,m}$ on X. Also note that any $\mathbb {Q}$ -Gorenstein toric variety has log-terminal singularities [Reference BatyrevBat98, Corollary 4.2], so the Gorenstein measure $\mu ^{\mathrm {Gor}}_X$ is well defined.

In this section, we prove Theorem 6.1 about the Gorenstein measure $\mu ^{\mathrm {Gor}}_X$ . In section 8, we will use this theorem and Theorem 7.1 to compare $\mu ^{\mathrm {Gor}}_X$ with the motivic measure $\mu _{\mathcal {X}}$ of the canonical stack $\mathcal {X}$ over X.

Although we will only use Theorem 6.1 in the case where $\sigma $ is d-dimensional, there is no need to make that assumption on $\sigma $ in this section.

Theorem 6.1. Set $w \in \sigma \cap N \subset \operatorname {\mathrm {Hom}}(\sigma ^\vee \cap N^*, \mathbb {N} \cup \{\infty \})$ .

  1. (a) The restriction of $\operatorname {\mathrm {ord}}_{\mathscr {J}_{X,m}}$ to $\operatorname {\mathrm {trop}}^{-1}(w) \subset \mathscr {L}(X)$ is constant and not equal to infinity. In particular, there exists some $j_w \in \mathbb {Z}$ such that for any measurable subset $C \subset \operatorname {\mathrm {trop}}^{-1}(w) \subset \mathscr {L}(X)$ ,

    $$ \begin{align*} \mu^{\mathrm{Gor}}_X(C) = \left(\mathbb{L}^{1/m}\right)^{j_w} \mu_X(C) \in \widehat{\mathscr{M}}_k\left[\mathbb{L}^{1/m}\right]. \end{align*} $$
  2. (b) The set $\operatorname {\mathrm {trop}}^{-1}(w) \subset \mathscr {L}(X)$ is measurable and

    $$ \begin{align*} \mu^{\mathrm{Gor}}_X\left(\operatorname{\mathrm{trop}}^{-1}(w)\right) = \mathbb{L}^{-d}(\mathbb{L}-1)^d \left(\mathbb{L}^{1/m}\right)^{- \left\langle w, q \right\rangle} \in \widehat{\mathscr{M}}_k\left[\mathbb{L}^{1/m}\right]. \end{align*} $$

Remark 6.2. Summing over $w \in \sigma \cap N$ , Theorem 6.1(b) gives Batyrev’s formula [Reference BatyrevBat98, Theorem 4.3] for the stringy Hodge–Deligne invariant of a toric variety. Furthermore, Theorem 6.1(b) appears to be a special case of [Reference Batyrev and MoreauBM13, Lemma 4.5]. For the benefit of the reader, we include a short self-contained proof.

Remark 6.3. When w is an integer combination of lattice points on the rays of $\sigma $ , we have that $\langle w, q \rangle $ is divisible by m, so in that case Theorem 6.1(b) implies

$$ \begin{align*} \mu^{\mathrm{Gor}}_X\left(\operatorname{\mathrm{trop}}^{-1}(w)\right) \in \widehat{\mathscr{M}}_k. \end{align*} $$

6.1 Gorenstein measure and monomial ideals

For the remainder of this section, let $M = N^*$ , let $P = \sigma ^\vee \cap M$ , and for each $p \in P$ , let $\chi ^p \in k[P]$ be the monomial indexed by p.

If $\mathscr {J}$ is a nonzero ideal sheaf on X generated by monomials $\left \{\chi ^{p_i}\right \}_i$ , then for any $\varphi \in \mathscr {L}(X)$ with $\operatorname {\mathrm {trop}}(\varphi ) = w$ ,

$$ \begin{align*} \operatorname{\mathrm{ord}}_{\mathscr{J}}(\varphi) = \min_i \langle w, p_i \rangle \in \mathbb{Z}_{\geq 0}. \end{align*} $$

Therefore, to prove Theorem 6.1(a) it is sufficient to show that the ideal $\mathscr {J}_{X,m}$ is generated by monomials.

For the remainder of this subsection, fix a basis $e_1, \dotsc , e_d$ for M, and for any $p_1, \dotsc , p_d \in P$ , set

$$ \begin{align*} c(p_1, \dotsc, p_d) = \det\left( \left(a_{i, j}\right)_{i, j}\right) \in \mathbb{Z}, \end{align*} $$

where the $a_{i, j} \in \mathbb {Z}$ are such that $p_j = \sum _{i = 1}^d a_{i, j} e_i$ for all $j \in \{1, \dotsc , d\}$ . For any $\left (p_{i,j}\right )_{i \in \left \{1, \dotsc , m\right \},j \in \left \{1, \dotsc , d\right \}} \in P^{md}$ , set

$$ \begin{align*} z\left(\left(p_{i,j}\right)_{i,j}\right) = \chi^{-q} \prod_{i = 1}^m c\left(p_{i,1}, \dotsc, p_{i,d}\right) \chi^{p_{i,1} + \dotsb + p_{i,d}} \in k[M]. \end{align*} $$

Lemma 6.4. Set $\left (p_{i,j}\right )_{i ,j} \in P^{md}$ . Then

$$ \begin{align*} z\left(\left(p_{i,j}\right)_{i,j}\right) \in k[P]. \end{align*} $$

Proof. If $-q + \sum _{ i = 1}^m \sum _{j =1}^d p_{i,j} \in P$ , we are done, so we may assume that there exists some first lattice point v of a ray of $\sigma $ such that $\left \langle v, -q + \sum _{ i = 1}^m \sum _{j =1}^d p_{i,j} \right \rangle < 0$ . Then

$$ \begin{align*} 0> \left\langle v, -q + \sum_{ i = 1}^m \sum_{j =1}^d p_{i,j}\right\rangle = \sum_{i =1}^m \left\langle v, -\frac{1}{m} q + \sum_{j =1}^d p_{i,j} \right\rangle = \sum_{i=1}^m \left(-1 + \sum_{j=1}^d \left\langle v, p_{i,j} \right\rangle \right), \end{align*} $$

so for some $i \in \{1, \dotsc , m\}$ , we have $\left \langle v, p_{i,j} \right \rangle = 0$ for all $j \in \{1, \dotsc , d\}$ , so

$$ \begin{align*} c\left(p_{i,1}, \dotsc, p_{i,d}\right) = 0, \end{align*} $$

which implies that $z\left (\left (p_{i,j}\right )_{i,j}\right ) = 0 \in k[P]$ .

We now prove the next proposition, which as discussed, immediately implies Theorem 6.1(a). Note that because $\sigma $ is pointed, $P^{\mathrm {gp}} = M$ , so the $c(p_1, \dotsc , p_d)$ are not all equal to $0$ and the $z\left (\left (p_{i,j}\right )_{i,j}\right )$ are not all equal to $0$ .

Proposition 6.5. The ideal $\mathscr {J}_{X,m}$ is generated by the set

$$ \begin{align*} \left\{ z\left(\left(p_{i,j}\right)_{i,j}\right) \mid \left(p_{i,j}\right)_{i ,j} \in P^{md}\right\}. \end{align*} $$

Proof. Since $k[P]$ is generated over k by the set $\{\chi ^p\mid p\in P\}$ , we see that $\Gamma \left (X,\Omega ^d_X\right )$ is generated by the elements $\chi ^{p_1}\wedge \dotsb \wedge \chi ^{p_d}$ as $p_1,\dotsc ,p_d$ range over elements of P. So $\Gamma \left (X,\left (\Omega _X^d\right )^{\otimes m}\right )$ is generated by the set

$$ \begin{align*} \left\{ \bigotimes_{i=1}^m \mathrm{d} \chi^{p_{i,1}} \wedge \dotsb \wedge \mathrm{d} \chi^{p_{i, d}} \mid \left(p_{i,j}\right)_{i ,j} \in P^{md}\right\}. \end{align*} $$

We next show that the global sections of $\omega _{X,m}$ are generated by

$$ \begin{align*} \chi^q \cdot \left( \mathrm{d}\log \chi^{e_1} \wedge \dotsb \wedge \mathrm{d} \log \chi^{e_d} \right)^{\otimes m}; \end{align*} $$

this is essentially given by [Reference Cox, Little and SchenckCLS11, Proposition 8.2.9], but they only state the result for $\omega _X$ instead of $\omega _{X,m}$ . The proof for all m works identically. To see this, let $\iota : X_{\mathrm {sm}} \hookrightarrow X$ be the inclusion of the smooth locus. By [Reference Cox, Little and SchenckCLS11, Theorem 8.2.3],

$$ \begin{align*} \omega_{X,m} = \iota_*\left( \left(\Omega_{X_{\mathrm{sm}}}^{\dim X}\right)^{\otimes m} \right)\cong\iota_*\mathcal{O}_{X_{\mathrm{sm}}}\left(-m\sum_\rho D_\rho\right)=\mathcal{O}_X\left(-m\sum_\rho D_\rho\right), \end{align*} $$

where the sum runs over all $\rho \in \Sigma (1)$ and $D_\rho $ denotes the corresponding torus-invariant divisor. Implicit in [Reference Cox, Little and SchenckCLS11, Theorem 8.2.3] is an identification of $\Omega _{X_{\mathrm {sm}}}^{\dim X}$ with a subsheaf of $\mathcal {O}_{X_{\mathrm {sm}}}$ ; this identification comes from [Reference Cox, Little and SchenckCLS11, Maps (8.1.3) and (8.1.5)] and can be described as follows. We have an inclusion of $\Omega _{X_{\mathrm {sm}}}^{\dim X}$ into the logarithmic differentials $\Omega _{X_{\mathrm {sm}}}^{\dim X}(\log D)$ , and the latter is isomorphic to $\mathcal {O}_{X_{\mathrm {sm}}}$ via the map

$$ \begin{gather*} \mathcal{O}_{X_{\mathrm{sm}}}\xrightarrow{\cong}\Omega_{X_{\mathrm{sm}}}^{\dim X}(\log D), \\ f\mapsto f\cdot \mathrm{d}\log \chi^{e_1} \wedge \dotsb \wedge \mathrm{d} \log \chi^{e_d}. \end{gather*} $$

For each $\rho \in \Sigma (1)$ , let $v_\rho $ denote the first lattice point on the ray $\rho $ . Having established that $\omega _{X,m}\cong \mathcal {O}_X\left (-m\sum _\rho D_\rho \right )$ , [Reference Cox, Little and SchenckCLS11, Proposition 4.3.2] tells us that $\Gamma \left (X,\omega _{X,m}\right )$ is generated over k by the sections of the form $\chi ^p \cdot \left ( \mathrm {d}\log \chi ^{e_1} \wedge \dotsb \wedge \mathrm {d} \log \chi ^{e_d} \right )^{\otimes m}$ for $p\in M$ such that $\left \langle p,v_\rho \right \rangle \geq m$ for all $\rho \in \Sigma (1)$ . This condition on the inner product implies $p-q\in P$ , and so $\Gamma \left (X,\omega _{X,m}\right )$ is generated over $k[P]$ by

$$ \begin{align*} \chi^q \cdot \left( \mathrm{d}\log \chi^{e_1} \wedge \dotsb \wedge \mathrm{d} \log \chi^{e_d} \right)^{\otimes m}. \end{align*} $$

Lastly, for any $p_1, \dotsc , p_d \in P$ ,

$$ \begin{align*} \mathrm{d} \chi^{p_1} \wedge \dotsb \wedge \mathrm{d} \chi^{p_d} &= \chi^{p_1+\dotsb + p_d } \cdot \mathrm{d}\log \chi^{p_1} \wedge \dotsb \wedge \mathrm{d} \log \chi^{p_d}\\ &= c(p_1, \dotsc, p_d) \chi^{p_1+\dotsb + p_d } \cdot \mathrm{d}\log \chi^{e_1} \wedge \dotsb \wedge \mathrm{d} \log \chi^{e_d}. \end{align*} $$

Thus for any $\left (p_{i,j}\right )_{i ,j} \in P^{md}$ ,

$$ \begin{align*} \bigotimes_{i=1}^m \mathrm{d} \chi^{p_{i,1}} \wedge \dotsb \wedge \mathrm{d} \chi^{p_{i, d}} = z\left(\left(p_{i,j}\right)_{i,j}\right) \cdot \chi^q \cdot \left( \mathrm{d}\log \chi^{e_1} \wedge \dotsb \wedge \mathrm{d} \log \chi^{e_d} \right)^{\otimes m}. \end{align*} $$

The proposition then follows from the definition of $\mathscr {J}_{X,m}$ .

Remark 6.6. Proposition 6.5 implies that if $\varphi \in \mathscr {L}(X)$ with $\operatorname {\mathrm {trop}}(\varphi )=w$ , then

$$ \begin{align*} \operatorname{\mathrm{ord}}_{\mathscr{J}_{X,m}}(\varphi) = - \langle w, q \rangle + \min_{\substack{p_1, \dotsc, p_d \in P\\ c\left(p_1, \dotsc, p_d\right) \neq 0}} m \langle w, p_1 + \dotsb + p_d \rangle, \end{align*} $$

so if w is an integer combination of lattice points on the rays of $\sigma $ , then $\operatorname {\mathrm {ord}}_{\mathscr {J}_{X,m}}(\varphi )$ is divisible by m and $\mu ^{\mathrm {Gor}}_X(C) \in \widehat {\mathscr {M}}_k$ for any measurable subset $C \subset \operatorname {\mathrm {trop}}^{-1}(w)$ .

6.2 Gorenstein measure and toric modifications

In this subsection, we complete the proof of Theorem 6.1(b). We first handle the case where $w = 0$ .

Proposition 6.7. We have

$$ \begin{align*} \mu^{\mathrm{Gor}}_X\left(\operatorname{\mathrm{trop}}^{-1}(0)\right) = \mathbb{L}^{-d}(\mathbb{L} - 1)^d. \end{align*} $$

Proof. If $\varphi \in \mathscr {L}(X)$ , then $\operatorname {\mathrm {trop}}(\varphi ) = 0$ if and only if $\varphi ^*(p)$ is a unit for all $p \in P$ , which occurs if and only if $\varphi \in \mathscr {L}(T)$ . Thus

$$ \begin{align*} \operatorname{\mathrm{trop}}^{-1}(0) = \mathscr{L}(T) \subset \mathscr{L}(X), \end{align*} $$

and because T is smooth, we have

$$ \begin{align*} \mu^{\mathrm{Gor}}_X\left(\operatorname{\mathrm{trop}}^{-1}(0)\right) = \mu_T(\mathscr{L}(T)) = \mathbb{L}^{-\dim T} \mathrm{e}(T) = \mathbb{L}^{-d}(\mathbb{L}-1)^d, \end{align*} $$

where the first equality is given by Theorem 6.1(a).

We now only need to prove Theorem 6.1(b) in the case where $w \neq 0$ . For the remainder of this section, fix $w \in \sigma \cap N$ , assume that $w \neq 0$ , and let $\ell \in \mathbb {Z}_{>0}$ be such that $(1/\ell )w$ is the first lattice point of the ray $\tau :=\mathbb {R}_{\geq 0} w$ . We will compute $\mu _X\left (\operatorname {\mathrm {trop}}^{-1}(w)\right )$ by applying the change-of-variables formula to a certain toric modification of X. Let $Y\cong \mathbb {A}^1\times \mathbb {G}_m^{d-1}$ be the affine T-toric variety whose fan is given by $\tau $ , let D be the (irreducible) boundary divisor of Y and let $\rho : Y \to X$ be the toric morphism induced by the identity map $N \to N$ . It is standard to compute the relative canonical divisor of such a birational toric morphism. In this case,

$$ \begin{align*} mK_{Y} - \rho^* (mK_X) = \left(\frac{1}{\ell}\langle w, q \rangle - m\right)D. \end{align*} $$

For the remainder of this section, let $\mathcal {O}(-D)$ be the ideal sheaf of D in Y.

Proposition 6.8. The map $\mathscr {L}(\rho ): \mathscr {L}(Y) \to \mathscr {L}(X)$ induces a bijection

$$ \begin{align*} \left(\operatorname{\mathrm{ord}}_{\mathcal{O}(-D)}^{-1}(\ell)\right)(k') \to \left(\operatorname{\mathrm{trop}}^{-1}(w)\right)(k') \end{align*} $$

for every field extension $k'$ of k.

Proof. Let $k'$ be a field extension of k. By construction, $\mathscr {L}(\rho )$ induces a bijection $(\mathscr {L}(Y) \setminus \mathscr {L}(Y \setminus T))(k') \to \left (\operatorname {\mathrm {trop}}^{-1}\left (N \cap \mathbb {R}_{\geq 0} w\right )\right )(k')$ . Therefore it is sufficient to show that

$$ \begin{align*} \mathscr{L}(\rho)^{-1}\left(\left(\operatorname{\mathrm{trop}}^{-1}(w)\right)(k')\right) = \left(\operatorname{\mathrm{ord}}_{\mathcal{O}(-D)}^{-1}(\ell)\right)(k'). \end{align*} $$

By Lemma 4.7(2), it is enough to show that if $u\in \tau ^\vee \cap M$ , there exists $u'\in \tau ^\vee \cap M$ with $u+u'\in \sigma ^\vee \cap M$ . Consider the quotient map $\eta \colon M\to M/\left (w^\perp \cap M\right )\cong \mathbb {Z}$ . Since $\sigma ^\vee \subset \tau ^\vee $ , we see that $\eta (\sigma ^\vee \cap M)\subset \eta (\tau ^\vee \cap M)=\mathbb {N}$ . So for any $u\in \tau ^\vee \cap M$ , there exists $n\in \mathbb {Z}_{>0}$ such that $n\eta (u)\in \eta (\sigma ^\vee \cap M)$ – that is, for some choice of $u''\in w^\perp \cap M$ , letting $u'=u''+(n-1)u$ , we have $u+u'\in \sigma ^\vee \cap M$ .

The next proposition completes the proof of Theorem 6.1(b).

Proposition 6.9. We have

$$ \begin{align*} \mu^{\mathrm{Gor}}_X\left(\operatorname{\mathrm{trop}}^{-1}(w)\right) = \mathbb{L}^{-d}(\mathbb{L}-1)^d \left(\mathbb{L}^{1/m}\right)^{- \left\langle w, q \right\rangle}. \end{align*} $$

Proof. By Theorem 6.1(a), there exists some $j_w \in \mathbb {Z}$ such that $\operatorname {\mathrm {ord}}_{\mathscr {J}_{X,m}}$ is equal to $j_w$ on $\operatorname {\mathrm {trop}}^{-1}(w)$ . By Proposition 6.8, we also have that $\operatorname {\mathrm {ord}}_{\mathscr {J}_{X,m}} \circ \mathscr {L}(\rho )$ is equal to $j_w$ on $\operatorname {\mathrm {ord}}_{\mathcal {O}(-D)}^{-1}(\ell )$ . Thus [Reference Chambert-Loir, Nicaise and SebagCLNS18, Chapter 7, Proposition 3.2.5] implies that on $\operatorname {\mathrm {ord}}_{\mathcal {O}(-D)}^{-1}(\ell )$ ,

$$ \begin{align*} - \operatorname{\mathrm{ordjac}}_\rho\ =\ -\frac{1}{m}\operatorname{\mathrm{ord}}_{\mathscr{J}_{X,m}} \circ \mathscr{L}(\rho) -\frac{1}{m}\left(\frac{1}{\ell}\langle w, q \rangle - m\right) \operatorname{\mathrm{ord}}_{\mathcal{O}(-D)}\ =\ -\frac{j_w}{m} - \frac{1}{m}\langle w, q \rangle + \ell, \end{align*} $$

where $\operatorname {\mathrm {ordjac}}_\rho : \mathscr {L}(Y) \to \mathbb {N} \cup \{\infty \}$ denotes the order function of the Jacobian ideal of $\rho $ . Therefore,

$$ \begin{align*} \mu^{\mathrm{Gor}}_X\left(\operatorname{\mathrm{trop}}^{-1}(w)\right) & = \int_{\operatorname{\mathrm{trop}}^{-1}(w)} \left(\mathbb{L}^{1/m}\right)^{\operatorname{\mathrm{ord}}_{\mathscr{J}_{X,m}}} \mathrm{d}\mu_X = \left(\mathbb{L}^{1/m}\right)^{j_w} \mu_X\left(\operatorname{\mathrm{trop}}^{-1}(w)\right)\\ & = \left(\mathbb{L}^{1/m}\right)^{j_w}\int_{\operatorname{\mathrm{ord}}_{\mathcal{O}(-D)}^{-1}(\ell)} \mathbb{L}^{-\operatorname{\mathrm{ordjac}}_\rho}\mathrm{d}\mu_Y = \left(\mathbb{L}^{1/m}\right)^{j_w}\int_{\operatorname{\mathrm{ord}}_{\mathcal{O}(-D)}^{-1}(\ell)} \mathbb{L}^{-j_w/m - \left\langle w, q \right\rangle/m + \ell}\mathrm{d}\mu_Y\\ &= \left(\mathbb{L}^{1/m}\right)^{-\left\langle w, q \right\rangle} \mathbb{L}^\ell \mu_Y\left(\operatorname{\mathrm{ord}}_{\mathcal{O}(-D)}^{-1}(\ell)\right) \ =\ \mathbb{L}^{-d}(\mathbb{L}-1)^d \left(\mathbb{L}^{1/m}\right)^{- \left\langle w, q \right\rangle}, \end{align*} $$

where the third equality is due to Proposition 6.8 and the motivic change-of-variables formula (see, for example, [Reference Chambert-Loir, Nicaise and SebagCLNS18, Chapter 6, Theorem 4.3.1]), and the final equality follows from

$$ \begin{align*} \mu_Y\left(\operatorname{\mathrm{ord}}_{\mathcal{O}(-D)}^{-1}(\ell)\right) = \mathrm{e}(D)(\mathbb{L}-1)\mathbb{L}^{-d-\ell} = (\mathbb{L}-1)^d\mathbb{L}^{-d-\ell}, \end{align*} $$

which is a consequence of [Reference Chambert-Loir, Nicaise and SebagCLNS18, Chapter 7, Lemma 3.3.3].

7 Motivic measure and canonical stacks

Set $d \in \mathbb {N}$ , let $N \cong \mathbb {Z}^d$ be a lattice, let $T = \operatorname {\mathrm {Spec}}(k[N^*])$ be the algebraic torus with cocharacter lattice N, let $\sigma $ be a pointed rational cone in $N_{\mathbb {R}}$ , let X be the affine T-toric variety associated to $\sigma $ , let $\mathcal {X}$ be the canonical stack over X and let $\pi : \mathcal {X} \to X$ be the canonical map. We assume that $\sigma $ is d-dimensional and use the notation listed in Notation 2.19. We assume that X is $\mathbb {Q}$ -Gorenstein and let $m \in \mathbb {Z}_{>0}$ and $q \in P$ be such that if v is the first lattice point of any ray of $\sigma $ ,

$$ \begin{align*} \langle v, q \rangle = m. \end{align*} $$

In this section, we prove the following theorem about the motivic measure $\mu _{\mathcal {X}}$ , which mirrors Theorem 6.1 for $\mu ^{\mathrm {Gor}}_X$ . In section 8, we will combine these two theorems to compare the measures $\mu _{\mathcal {X}}$ and $\mu ^{\mathrm {Gor}}_X$ .

Theorem 7.1. Set $w \in \sigma \cap N \subset \operatorname {\mathrm {Hom}}(P, \mathbb {N} \cup \{\infty \})$ .

  1. (a) If $C \subset \operatorname {\mathrm {trop}}^{-1}(w) \subset \mathscr {L}(X)$ is measurable, then $\mathscr {L}(\pi )^{-1}(C)$ is a measurable subset of $\lvert \mathscr {L}(\mathcal {X})\rvert $ . Furthermore, there exists $\Theta _w \in \widehat {\mathscr {M}}_k$ such that for any measurable subset $C \subset \operatorname {\mathrm {trop}}^{-1}(w) \subset \mathscr {L}(X)$ ,

    $$ \begin{align*} \mu_{\mathcal{X}}\left(\mathscr{L}(\pi)^{-1}(C)\right) = \Theta_w \mu_X(C). \end{align*} $$
  2. (b) The set $\mathscr {L}(\pi )^{-1}\left (\operatorname {\mathrm {trop}}^{-1}(w)\right ) \subset \lvert \mathscr {L}(\mathcal {X})\rvert $ is measurable and

    $$ \begin{align*} \mu_{\mathcal{X}}\left(\mathscr{L}(\pi)^{-1}\left(\operatorname{\mathrm{trop}}^{-1}(w)\right)\right) = \left(\# \beta^{-1}(w)\right) \mathbb{L}^{-d}(\mathbb{L}-1)^d \left(\mathbb{L}^{1/m}\right)^{- \left\langle w, q \right\rangle}. \end{align*} $$

Remark 7.2. A priori, we only have that

$$ \begin{align*} \left(\# \beta^{-1}(w)\right) \mathbb{L}^{-d}(\mathbb{L}-1)^d \left(\mathbb{L}^{1/m}\right)^{- \left\langle w, q \right\rangle} \in \widehat{\mathscr{M}}_k\left[\mathbb{L}^{1/m}\right] \supset \widehat{\mathscr{M}_k}; \end{align*} $$

but by Lemma 7.9 we have either that $\beta ^{-1}(w) = \emptyset $ or that $\langle w, q \rangle $ is divisible by m, so

$$ \begin{align*} \left(\# \beta^{-1}(w)\right) \mathbb{L}^{-d}(\mathbb{L}-1)^d \left(\mathbb{L}^{1/m}\right)^{- \left\langle w, q \right\rangle} \in \widehat{\mathscr{M}}_k. \end{align*} $$

Before we prove Theorem 7.1, we show that it implies the next proposition.

Proposition 7.3. Let $C \subset \mathscr {L}(X)$ be a measurable subset. Then $\mathscr {L}(\pi )^{-1}(C)$ is a measurable subset of $\lvert \mathscr {L}(\mathcal {X})\rvert $ and

$$ \begin{align*} \mu_{\mathcal{X}}\left(\mathscr{L}(\pi)^{-1}(C)\right) = \sum_{w \in \sigma \cap N} \mu_{\mathcal{X}}\left(\mathscr{L}(\pi)^{-1}\left(\operatorname{\mathrm{trop}}^{-1}(w) \cap C\right)\right). \end{align*} $$

Remark 7.4. By Remark 4.6 and Theorem 7.1(a), each $\mathscr {L}(\pi )^{-1}\left (\operatorname {\mathrm {trop}}^{-1}(w) \cap C\right )$ in the statement of Proposition 7.3 is a measurable subset of $\lvert \mathscr {L}(\mathcal {X})\rvert $ .

Proof. Set

$$ \begin{align*} \mathcal{C} &= \mathscr{L}(\pi)^{-1}(C),\\ \mathcal{C}^{(0)} &= \bigcup_{w \in \sigma \cap N} \mathscr{L}(\pi)^{-1}\left(\operatorname{\mathrm{trop}}^{-1}(w) \cap C\right),\\ \mathcal{C}^{(\infty)} &= \mathcal{C} \setminus \mathcal{C}^{(0)}. \end{align*} $$

For each $w \in \sigma \cap N$ ,

$$ \begin{align*} \left\lVert \mu_{\mathcal{X}}\left(\mathscr{L}(\pi)^{-1}\left(\operatorname{\mathrm{trop}}^{-1}(w) \cap C\right)\right) \right\rVert &\leq \left\lVert \mu_{\mathcal{X}}\left(\mathscr{L}(\pi)^{-1}\left(\operatorname{\mathrm{trop}}^{-1}(w)\right)\right) \right\rVert\\ &\leq \left\lVert \mathbb{L}^{-d}(\mathbb{L}-1)^d \right\rVert \exp(-\langle w, q \rangle/m), \end{align*} $$

where the first inequality is by Proposition 3.29 and the second is by Theorem 7.1(b). For each $\varepsilon \in \mathbb {R}_{>0}$ there are only finitely many $w \in \sigma \cap N$ with $\exp (-\langle w, q \rangle / m) \geq \varepsilon $ , so Proposition 3.27 implies that $\mathcal {C}^{(0)}$ is measurable and

$$ \begin{align*} \mu_{\mathcal{X}}\left(\mathcal{C}^{(0)}\right) = \sum_{w \in \sigma \cap N} \mu_{\mathcal{X}}\left(\mathscr{L}(\pi)^{-1}\left(\operatorname{\mathrm{trop}}^{-1}(w) \cap C\right)\right). \end{align*} $$

By Proposition 3.28 and Proposition 3.30, the set $\mathcal {C}^{(\infty )}$ is measurable and

$$ \begin{align*} \mu_{\mathcal{X}}\left(\mathcal{C}^{(\infty)}\right) = 0. \end{align*} $$

Therefore by Proposition 3.27, the set $\mathcal {C} = \mathcal {C}^{(0)} \sqcup \mathcal {C}^{(\infty )}$ is measurable and

$$ \begin{align*} \mu_{\mathcal{X}}(\mathcal{C}) = \mu_{\mathcal{X}}\left(\mathcal{C}^{(0)}\right) = \sum_{w \in \sigma \cap N} \mu_{\mathcal{X}}\left(\mathscr{L}(\pi)^{-1}\left(\operatorname{\mathrm{trop}}^{-1}(w) \cap C\right)\right).\\[-40pt] \end{align*} $$

We will use the remainder of this section to prove Theorem 7.1.

7.1 Canonical stacks and preimages of measurable subsets

In this subsection, we will prove Theorem 7.1(a). We begin with a couple lemmas.

Lemma 7.5. Let Y be an irreducible finite-type scheme over k with smooth locus $Y_{\mathrm {sm}} \subset Y$ , and let $C \subset \mathscr {L}(Y)$ be a cylinder such that $C \cap \mathscr {L}(Y \setminus Y_{\mathrm {sm}}) = \emptyset $ .

Then there exists some $n_C \in \mathbb {N}$ that satisfies the following: For any field extension $k'$ of k, any $n \geq n_C$ and any $\varphi _n \in \mathscr {L}_n(Y)(k')$ with image in $\theta _n(C)$ , there exists some $\varphi \in \mathscr {L}(Y)(k')$ with image in C such that $\theta _n(\varphi ) = \varphi _n$ .

Proof. By [Reference Chambert-Loir, Nicaise and SebagCLNS18, Chapter 5, Propositions 1.3.2(a) and 2.3.4], there exists a function $\operatorname {\mathrm {ordjac}}_Y: \mathscr {L}(Y) \to \mathbb {N} \cup \{\infty \}$ and some $c \in \mathbb {Z}_{>0}$ such that

  • for every $n \in \mathbb {N}$ , the set $\operatorname {\mathrm {ordjac}}_Y^{-1}(n) \subset \mathscr {L}(Y)$ is a cylinder;

  • the image of $\mathscr {L}(Y) \setminus \mathscr {L}(Y \setminus Y_{\mathrm {sm}})$ under $\operatorname {\mathrm {ordjac}}_Y$ is contained in $\mathbb {N}$ ; and

  • for every $n \in \mathbb {N}$ , field extension $k'$ of k and $\varphi _n \in \mathscr {L}_n(Y)(k')$ whose image in $\mathscr {L}_n(Y)$ is contained in $\theta _{n}\left ( \operatorname {\mathrm {ordjac}}_Y^{-1}(n') \right )$ for some $n' \leq n/c$ , there exists some $\varphi \in \mathscr {L}(Y)(k')$ with $\theta _n(\varphi ) = \varphi _n$ .

Because $C \cap \mathscr {L}(Y \setminus Y_{\mathrm {sm}}) = \emptyset $ , the collection $\left \{\operatorname {\mathrm {ordjac}}_Y^{-1}(n)\right \}_{n \in \mathbb {N}}$ is a cover of the cylinder C by cylinders. Thus by the quasicompactness of the constructible topology of $\mathscr {L}(Y)$ (see, for example, [Reference Chambert-Loir, Nicaise and SebagCLNS18, Appendix, Theorem 1.2.4(a)]), there exists some $n^{\prime }_C \in \mathbb {N}$ such that $C \subset \bigcup _{n = 0}^{n^{\prime }_C} \operatorname {\mathrm {ordjac}}_Y^{-1}(n)$ . Let $n_C \in \mathbb {N}$ be such that $n_C \geq cn^{\prime }_C$ and such that C is the preimage under $\theta _{n_C}$ of a constructible subset of $\mathscr {L}_{n_C}(Y)$ .

Now let $k'$ be a field extension of k, let $n \geq n_C$ and let $\varphi _n \in \mathscr {L}_n(Y)(k')$ have image in $\theta _n(C)$ . Then the image of $\varphi _n$ is contained in $\theta _n\left (\operatorname {\mathrm {ordjac}}_Y^{-1}(n')\right )$ for some $n' \leq n^{\prime }_C \leq n_C/c \leq n/c$ , so there exists some $\varphi \in \mathscr {L}(Y)(k')$ with $\theta _n(\varphi ) = \varphi _n$ . Because C is the preimage of a subset of $\mathscr {L}_n(Y)$ , the arc $\varphi $ has image in C.

Lemma 7.6. Let Y be a finite-type scheme over k, let $\mathcal {Y}$ be a smooth Artin stack over k, let $\xi : \mathcal {Y} \to Y$ be a morphism, let $C \subset \mathscr {L}(Y)$ be a cylinder and set $\mathcal {C} = \mathscr {L}(\xi )^{-1}(C) \subset \lvert \mathscr {L}(\mathcal {Y}) \rvert $ .

Then $\mathcal {C}$ is a cylinder and there exists some $n_0 \in \mathbb {N}$ such that for all $n \geq n_0$ ,

$$ \begin{align*} \theta_n(\mathcal{C}) = \mathscr{L}_n(\xi)^{-1}(\theta_n(C)). \end{align*} $$

Proof. We first note that for all $n \in \mathbb {N}$ , we have an obvious inclusion

$$ \begin{align*} \theta_n(\mathcal{C}) \subset \mathscr{L}_n(\xi)^{-1}(\theta_n(C)). \end{align*} $$

Because C is a cylinder, there exists some $n_0 \in \mathbb {N}$ and some constructible subset $C_{n_0} \subset \mathscr {L}_{n_0}(Y)$ such that $C = \left (\theta _{n_0}\right )^{-1}\left (C_{n_0}\right )$ . Then

$$ \begin{align*} \mathcal{C} = \mathscr{L}(\xi)^{-1}\left( \left(\theta_{n_0}\right)^{-1}\left(C_{n_0}\right) \right) = \left(\theta_{n_0}\right)^{-1}\left( \mathscr{L}_n(\xi)^{-1}\left(C_{n_0}\right) \right) \end{align*} $$

is a cylinder because $\mathscr {L}_n(\xi )^{-1}\left (C_{n_0}\right )$ is a constructible subset of $\lvert \mathscr {L}_n(\mathcal {Y})\rvert $ . We will finish this proof by showing that for any $n \geq n_0$ , we have $\theta _n(\mathcal {C}) \supset \mathscr {L}_n(\xi )^{-1}(\theta _n(C))$ .

Set $n \geq n_0$ and $\varphi _n \in \mathscr {L}_n(\xi )^{-1}(\theta _n(C))$ . Because $\mathcal {Y}$ is smooth, there exists some $\varphi \in \lvert \mathscr {L}(\mathcal {Y})\rvert $ such that $\theta _n(\varphi ) = \varphi _n$ . Then $\theta _n(\mathscr {L}(\xi )(\varphi )) = \mathscr {L}_n(\xi )( \varphi _n ) \in \theta _n(C)$ , so $\mathscr {L}(\xi )(\varphi ) \in (\theta _n)^{-1}(\theta _n(C))$ . But $(\theta _n)^{-1}(\theta _n(C)) = C$ , because $C = (\theta _n)^{-1}\left ( \left (\theta ^n_{n_0}\right )^{-1}\left (C_{n_0}\right ) \right )$ is the preimage of a subset of $\mathscr {L}_n(Y)$ . Thus $\mathscr {L}(\xi )(\varphi ) \in C$ , which implies $\varphi \in \mathcal {C}$ and $\varphi _n \in \theta _n(\mathcal {C})$ .

We may now prove the special case of Theorem 7.1(a) where C is a cylinder.

Proposition 7.7. Set $w \in \sigma \cap N$ . If $C \subset \operatorname {\mathrm {trop}}^{-1}(w) \subset \mathscr {L}(X)$ is a cylinder, then $\mathscr {L}(\pi )^{-1}(C)\subset \lvert \mathscr {L}(\mathcal {X})\rvert $ is a cylinder. Furthermore, there exists some $\Theta _w \in \widehat {\mathscr {M}}_k$ such that for any cylinder $C \subset \operatorname {\mathrm {trop}}^{-1}(w) \subset \mathscr {L}(X)$ ,

$$ \begin{align*} \mu_{\mathcal{X}}\left(\mathscr{L}(\pi)^{-1}(C)\right) = \Theta_w \mu_X(C). \end{align*} $$

Proof. Let $n_w, \Theta _w, \{\mathcal {F}_n\}_{n \geq n_w}$ be as in the statement of Theorem 5.1, and let $n_{\operatorname {\mathrm {trop}}^{-1}(w)}$ be as in the statement of Lemma 7.5 (with $Y = X$ and $C = \operatorname {\mathrm {trop}}^{-1}(w)$ ). We show that if $n \geq \max \left \{n_w, n_{\operatorname {\mathrm {trop}}^{-1}(w)}\right \}$ and $C_n \subset \theta _n\left (\operatorname {\mathrm {trop}}^{-1}(w)\right )$ is constructible, then

$$ \begin{align*} \mathrm{e}\left(\mathscr{L}_n(\pi)^{-1}(C_n)\right) = \Theta_w \mathrm{e}(C_n). \end{align*} $$

Let $n \geq \max \left \{n_w, n_{\operatorname {\mathrm {trop}}^{-1}(w)}\right \}$ , let $k'$ be a field extension of k and set $\varphi _n \in \mathscr {L}_n(X)(k')$ with image in $\theta _n\left (\operatorname {\mathrm {trop}}^{-1}(w)\right )$ . Then by our choice of $n_{\operatorname {\mathrm {trop}}^{-1}(w)}$ , there exists some $\varphi \in \mathscr {L}(X)(k')$ such that $\operatorname {\mathrm {trop}}(\varphi ) = w$ and $\theta _n(\varphi ) = \varphi _n$ . Then by our choice of $n_w$ and $\mathcal {F}_n$ ,

$$ \begin{align*} \mathscr{L}_n(\pi)^{-1}(\varphi_n)_{\mathrm{red}} \cong \mathcal{F}_n \otimes_k k'. \end{align*} $$

Therefore Proposition 2.5, Remark 2.7, and Proposition 2.8 imply that for any constructible subset $C_n \subset \theta _n\left (\operatorname {\mathrm {trop}}^{-1}(w)\right )$ ,

$$ \begin{align*} \mathrm{e}\left(\mathscr{L}_n(\pi)^{-1}(C_n)\right) = \mathrm{e}(\mathcal{F}_n)\mathrm{e}(C_n) = \Theta_w \mathrm{e}(C_n), \end{align*} $$

where the second equality holds by our choice of $n_w, \Theta _w, \mathcal {F}_n$ .

Now let $C \subset \operatorname {\mathrm {trop}}^{-1}(w)$ be a cylinder, and let $\mathcal {C} = \mathscr {L}(\pi )^{-1}(C) \subset \lvert \mathscr {L}(\mathcal {X})\rvert $ . Then $\mathcal {C}$ is a cylinder by Lemma 7.6. Let $n_0$ be as in the statement of Lemma 7.6 (with $\xi = \pi $ ). Then for any $n \geq \max \left \{n_w, n_{\operatorname {\mathrm {trop}}^{-1}(w)}, n_0\right \}$ ,

$$ \begin{align*} \mathrm{e}(\theta_n( \mathcal{C} )) = \mathrm{e}\left(\mathscr{L}_n(\pi)^{-1}(\theta_n(C))\right) = \Theta_w \mathrm{e}(\theta_n(C)), \end{align*} $$

where the first equality holds by our choice of $n_0$ . Therefore

$$ \begin{align*} \mu_{\mathcal{X}}( \mathcal{C} ) &= \lim_{n \to \infty} \mathrm{e}(\theta_n(\mathcal{C}))\mathbb{L}^{-(n+1)\dim\mathcal{X}}\\ &= \Theta_w \lim_{n \to \infty} \mathrm{e}(\theta_n(C))\mathbb{L}^{-(n+1)\dim X}\\ &= \Theta_w \mu_X(C).\\[-36pt] \end{align*} $$

Now we may complete the proof of Theorem 7.1(a) in general.

Proof of Theorem 7.1(a)

Set $w \in \sigma \cap N$ , let $\Theta _w$ be as in the statement of Proposition 7.7 and let $C \subset \operatorname {\mathrm {trop}}^{-1}(w)$ be a measurable subset of $\mathscr {L}(X)$ .

For any $\varepsilon \in \mathbb {R}_{>0}$ and any cylindrical $\varepsilon $ -approximation $\left (C^{(0)}, \left (C^{(i)}\right )_{i \in I}\right )$ of C, Proposition 7.7 implies that $\left (\mathscr {L}(\pi )^{-1}\left (C^{(0)}\right ),\left (\mathscr {L}(\pi )^{-1}\left (C^{(i)}\right )\right )_{i \in I}\right )$ is a cylindrical $\varepsilon \lVert \Theta _w \rVert $ -approximation of $\mathscr {L}(\pi )^{-1}(C)$ . Therefore $\mathscr {L}(\pi )^{-1}(C)$ is measurable, and by another application of Proposition 7.7,

$$ \begin{align*} \mu_{\mathcal{X}}\left(\mathscr{L}(\pi)^{-1}(C)\right) = \Theta_w \mu_X(C).\\[-38pt] \end{align*} $$

7.2 Quotient by an algebraic torus

In order to apply Theorem 3.9 to prove Theorem 7.1(b), we must rewrite our fantastack as the quotient by a torus. The following result provides an explicit way to do so:

Proposition 7.8. Define $\widehat {N} := \widetilde {N} \oplus N$ and let $\widehat {\sigma } = \widetilde {\sigma } \times \{0\}$ . Letting $\widehat {X}$ be the toric variety associated to $\widehat {\sigma }$ , there is a $\widetilde {T}$ -action on $\widehat {X}$ and an isomorphism $\left [\widehat {X} / \widetilde {T}\right ] \xrightarrow {\sim } \mathcal {X}$ such that $\widehat {X} \to \left [\widehat {X} / \widetilde {T}\right ] \xrightarrow {\sim } \mathcal {X} \xrightarrow {\pi } X$ is the toric morphism induced by $\nu \oplus \operatorname {\mathrm {id}}\colon \widehat {N} \to N$ .

Proof. For ease of notation, let $\widehat {\nu }=\nu \oplus \operatorname {\mathrm {id}}$ and consider the stacky fan $\left (\widehat {\sigma },\widehat {\nu }\right )$ . One computes that $\operatorname {\mathrm {cok}}\left (\widehat {\nu }^*\right )=\widetilde {M}$ and hence $G_{\widehat {\nu }}=\widetilde {T}$ . As a result, $\mathcal {X}_{\widehat {\sigma },\widehat {\nu }}=\left [\widehat {X} / \widetilde {T}\right ]$ for an appropriate $\widetilde {T}$ -action on $\widehat {X}$ .

Next note that $\mathcal {X}$ is, by definition, the toric stack $\mathcal {X}_{\widetilde {\sigma },\nu }$ , and consider the following commutative diagram, where the vertical maps are stacky fans and the horizontal maps are morphisms between the stacky fans:

This induces morphisms $\mathcal {X}\to \left [\widehat {X} / \widetilde {T}\right ]\to X$ of toric stacks, and the composite is the morphism $\pi $ . By [Reference Geraschenko and SatrianoGS15a, Lemma B.17], the former map is an isomorphism of toric stacks; this is the inverse of our desired isomorphism $\left [\widehat {X} / \widetilde {T}\right ] \xrightarrow {\sim } \mathcal {X}$ . Lastly, we see that the toric morphism $\widehat {X}\to \left [\widehat {X} / \widetilde {T}\right ]\to X$ is induced by the rightmost map in the top row of the diagram, namely $\widehat {\nu }\colon \widehat {N} \to N$ .

7.3 Canonical stacks and preimages of cocharacters

We end this section by proving Theorem 7.1(b).

For the remainder of this section, let $r = \operatorname {\mathrm {rk}} \widetilde {N}$ , let $v_1, \dotsc , v_r$ be the first lattice points of the rays of $\sigma $ , let $e_1, \dotsc , e_r$ be the generators of $\widetilde {N}$ indexed by the rays $\mathbb {R}_{\geq 0} v_1, \dotsc , \mathbb {R}_{\geq 0} v_r$ , so

$$ \begin{align*} \beta(e_i) = v_i \end{align*} $$

for all $i \in \{1, \dotsc , r\}$ , and let $f_1, \dotsc , f_r$ be the basis of $\widetilde {M}$ dual to $e_1, \dotsc , e_r$ . Thus $f_1, \dotsc , f_r$ are the minimal generators of the monoid F.

Lemma 7.9. We have the equality

$$ \begin{align*} m(f_1 + \dotsb + f_r) = q.\\[-15pt] \end{align*} $$

Proof. Because the inclusion $P \hookrightarrow F$ is dual to $\beta $ ,

$$ \begin{align*} \langle e_i, q \rangle = m\\[-15pt] \end{align*} $$

for all $i \in \{1, \dotsc , r\}$ . Then

$$ \begin{align*} m(f_1 + \dotsb + f_r) = \langle e_1, q \rangle f_1 + \dotsb + \langle e_r, q \rangle f_r = q.\\[-40pt] \end{align*} $$

For the remainder of this section, let $\widehat {N}$ , $\widehat {\sigma }$ and $\widehat {X}$ be as in Proposition 7.8. Let $\rho : \widehat {X} \to \mathcal {X}$ be the composition $\widehat {X} \to \left [ \widehat {X} / \widetilde {T} \right ] \xrightarrow {\sim } \mathcal {X}$ , where the $\widetilde {T}$ -action on $\widehat {X}$ and the isomorphism $\left [ \widehat {X} / \widetilde {T} \right ] \xrightarrow {\sim } \mathcal {X}$ are as in the statement of Proposition 7.8; let $D_1, \dotsc , D_r$ be the divisors of $\widehat {X}$ indexed by $e_1 \oplus 0, \dotsc , e_r\oplus 0 \in \widetilde {N} \oplus N = \widehat {N}$ , respectively; and let $\mathcal {O}(-D_1), \dotsc , \mathcal {O}(-D_r)$ be the ideal sheaves on $\widehat {X}$ of $D_1, \dotsc , D_r$ , respectively. Note that for all $i \in \{1, \dotsc , r\}$ , the ideal $\mathcal {O}(-D_i)$ is generated by the monomial in $k[F \oplus M]$ indexed by $f_i \oplus 0$ .

Proposition 7.10. Set $w \in \sigma \cap N$ . Then

$$ \begin{align*} \mathscr{L}(\rho)^{-1} \left( \mathscr{L}(\pi)^{-1}\left(\operatorname{\mathrm{trop}}^{-1}(w)\right) \right) = \bigcup_{\widetilde{w} \in \beta^{-1}(w)} \left( \bigcap_{i =1}^r \operatorname{\mathrm{ord}}_{\mathcal{O}\left(-D_i\right)}^{-1}\left( \left\langle \widetilde{w}, f_i \right\rangle \right) \right).\\[-15pt] \end{align*} $$

Proof. By Remark 4.6 and Lemma 4.7(2), it is enough to show that for any $\widehat {f}\in \widehat {\sigma }^\vee \cap \widehat {N}^*$ , there exists $\widehat {f}'\in \widehat {\sigma }^\vee \cap \widehat {N}^*$ such that $\widehat {f}+\widehat {f}'$ is in the image of $\sigma ^\vee \cap M$ . By the definition of $\widehat {\nu }$ , the map

$$ \begin{align*} P=\sigma^\vee\cap M\to\widehat{\sigma}^\vee\cap\widehat{N}^*=\left(\widetilde{\sigma}^\vee\cap\widetilde{M}\right)\oplus 0=F\oplus 0\\[-15pt] \end{align*} $$

is precisely $p\mapsto (p,0)$ . The result then follows from Proposition 2.14.

We may now complete the proof of Theorem 7.1(b).

Proof of Theorem 7.1(b)

Set $w \in \sigma \cap N$ , and set

$$ \begin{align*} \widehat{C} = \mathscr{L}(\rho)^{-1} \left( \mathscr{L}(\pi)^{-1}\left(\operatorname{\mathrm{trop}}^{-1}(w)\right) \right) \subset \mathscr{L}\left(\widehat{X}\right). \\[-15pt]\end{align*} $$

Then

$$ \begin{align*} \mu_{\widehat{X}} \left(\widehat{C}\right) &= \mu_{\widehat{X}}\left( \bigcup_{\widetilde{w} \in \beta^{-1}(w)} \left( \bigcap_{i =1}^r \operatorname{\mathrm{ord}}_{\mathcal{O}\left(-D_i\right)}^{-1}\left( \left\langle \widetilde{w}, f_i \right\rangle \right) \right) \right)\\ &= \sum_{\widetilde{w} \in \beta^{-1}(w)} \mu_{\widehat{X}} \left( \bigcap_{i =1}^r \operatorname{\mathrm{ord}}_{\mathcal{O}\left(-D_i\right)}^{-1}\left( \left\langle \widetilde{w}, f_i \right\rangle \right) \right)\\ &= \sum_{\widetilde{w} \in \beta^{-1}(w)} (\mathbb{L}-1)^{r+d} \mathbb{L}^{-(r+d)-\sum_{i =1}^r \left\langle \widetilde{w}, f_i\right\rangle}\\ &=\sum_{\widetilde{w} \in \beta^{-1}(w)} (\mathbb{L}-1)^{r+d} \mathbb{L}^{-(r+d) - \left\langle w, q \right\rangle/m}\\ &= \left(\#\beta^{-1}(w)\right)(\mathbb{L}-1)^{r+d} \mathbb{L}^{-(r+d) - \left\langle w, q \right\rangle/m}, \end{align*} $$

where the first equality is by Proposition 7.10, the second is by Proposition 2.15 and the fact that the union in the first line is disjoint, the third equality is by [Reference Chambert-Loir, Nicaise and SebagCLNS18, Chapter 7, Lemma 3.3.3] and the definition of $\widehat {X}$ and $D_1, \dotsc , D_r$ and the fourth equality is by Lemma 7.9.

The set $\mathscr {L}(\pi )^{-1}\left (\operatorname {\mathrm {trop}}^{-1}(w)\right ) \subset \lvert \mathscr {L}(\mathcal {X})\rvert $ is a cylinder, by Remark 4.6 and Proposition 7.7. Then by Theorem 3.9,

$$ \begin{align*} \mu_{\mathcal{X}}\left( \mathscr{L}(\pi)^{-1}\left(\operatorname{\mathrm{trop}}^{-1}(w)\right)\right) &= \mu_{\widehat{X}} \left(\widehat{C}\right) \mathrm{e}\left(\widetilde{T}\right)^{-1} \mathbb{L}^{\dim \widetilde{T}}\\ &= \left(\#\beta^{-1}(w)\right)(\mathbb{L}-1)^{d} \mathbb{L}^{-d - \left\langle w, q \right\rangle/m}.\\[-36pt] \end{align*} $$

8 Stringy invariants and toric Artin stacks: Proof of Theorem 1.7

We complete the proof of Theorem 1.7 in this section. Set $d \in \mathbb {N}$ , let $N \cong \mathbb {Z}^d$ be a lattice and let $T = \operatorname {\mathrm {Spec}}(k[N^*])$ be the algebraic torus with cocharacter lattice N. We recall the following lemma, whose proof is standard:

Lemma 8.1. Let $\sigma $ be a pointed rational cone in $N_{\mathbb {R}}$ , and assume that the affine T-toric variety associated to it is $\mathbb {Q}$ -Gorenstein. Then there exists a d-dimensional pointed rational cone $\overline {\sigma }$ in $N_{\mathbb {R}}$ such that $\sigma $ is a face of $\overline {\sigma }$ and the T-toric variety associeted to $\overline {\sigma }$ is $\mathbb {Q}$ -Gorenstein.

Remark 8.2. By Remark 1.8, Proposition 2.18, Proposition 3.27, Proposition 3.31, Proposition 3.32 and Lemma 8.1, to prove Theorem 1.7 it is sufficient to prove the special case where $\mathcal {X}$ is the canonical stack over an affine T-toric variety defined by a d-dimensional cone in $N_{\mathbb {R}}$ .

Set $\sigma $ be a d-dimensional pointed rational cone in $N_{\mathbb {R}}$ , let X be the affine T-toric variety associated to $\sigma $ , let $\mathcal {X}$ be the canonical stack over X, let $\pi : \mathcal {X} \to X$ be the canonical map and assume that X is $\mathbb {Q}$ -Gorenstein. We will use the notation listed in Notation 2.19.

Proposition 8.3. Set $W \subset \sigma \cap N$ . Then

$$ \begin{align*} \bigcup_{w \in W} \operatorname{\mathrm{trop}}^{-1}(w) \end{align*} $$

is a measurable subset of $\mathscr {L}(X)$ .

Proof. We have that $\mathscr {L}(X \setminus T)$ is a measurable subset of $\mathscr {L}(X)$ , because $X \setminus T$ is a closed subscheme of X. For each $w \in \sigma \cap N$ , the set $\operatorname {\mathrm {trop}}^{-1}(w)$ is a measurable subset of $\mathscr {L}(X)$ by Remark 4.6. Also,

$$ \begin{align*} \mathscr{L}(X \setminus T) \cup \bigcup_{w \in \sigma \cap N} \operatorname{\mathrm{trop}}^{-1}(w) = \mathscr{L}(X) \end{align*} $$

is measurable and disjoint, so for any $\varepsilon \in \mathbb {R}_{>0}$ , there are only finitely many $w \in \sigma \cap N$ such that $\left \lVert \mu _X\left (\operatorname {\mathrm {trop}}^{-1}(w)\right )\right \rVert \geq \varepsilon $ . Thus $\bigcup _{w \in W} \operatorname {\mathrm {trop}}^{-1}(w)$ is a measurable subset of $\mathscr {L}(X)$ .

Proposition 8.4. The function $\operatorname {\mathrm {sep}}_\pi : \mathscr {L}(X) \to \mathbb {N}$ has measurable fibres.

Proof. Theorem 4.9 implies that for any $\varphi \in \mathscr {L}(X)$ with $\operatorname {\mathrm {trop}}(\varphi ) \in \sigma \cap N$ ,

$$ \begin{align*} \operatorname{\mathrm{sep}}_\pi(\varphi) = \#\beta^{-1}(\operatorname{\mathrm{trop}}(\varphi)). \end{align*} $$

Thus, noting that each $\beta ^{-1}(w)$ is finite, we have that for any $n \in \mathbb {N}$ ,

$$ \begin{align*} \operatorname{\mathrm{sep}}_\pi^{-1}(n) = \left( \operatorname{\mathrm{sep}}_\pi^{-1}(n) \cap \mathscr{L}(X \setminus T) \right) \cup \bigcup_{\substack{w \in \sigma \cap N\\ \#\beta^{-1}(w) = n}} \operatorname{\mathrm{trop}}^{-1}(w) \end{align*} $$

is measurable by Proposition 8.3 and the fact that $\mu _X(\mathscr {L}(X \setminus T)) = 0$ , which implies that any subset of $\mathscr {L}(X \setminus T)$ is a measurable subset of $\mathscr {L}(X)$ .

For the remainder of this section, we will use the fact that by Proposition 8.4, the integral $\int _C \operatorname {\mathrm {sep}}_\pi \mathrm {d}\mu ^{\mathrm {Gor}}_X$ is well defined for any measurable subset $C \subset \mathscr {L}(X)$ .

We end this section with the next proposition, which along with Remark 8.2 and Proposition 8.4 implies Theorem 1.7.

Proposition 8.5. Let C be a measurable subset of $\mathscr {L}(X)$ . Then $\mathscr {L}(\pi )^{-1}(C)$ is a measurable subset of $\lvert \mathscr {L}(\mathcal {X})\rvert $ and

$$ \begin{align*} \mu_{\mathcal{X}}\left(\mathscr{L}(\pi)^{-1}(C)\right) = \int_C \operatorname{\mathrm{sep}}_\pi \mathrm{d}\mu^{\mathrm{Gor}}_X. \end{align*} $$

Proof. By Proposition 2.3, Proposition 7.3 and the fact that

$$ \begin{align*} \mu_X\left(\mathscr{L}(X) \setminus \bigcup_{w \in \sigma \cap N} \operatorname{\mathrm{trop}}^{-1}(w) \right) = \mu_X \left(\mathscr{L}(X \setminus T)\right) = 0, \end{align*} $$

it is enough to prove the statement for each $\operatorname {\mathrm {trop}}^{-1}(w)\cap C$ . In other words, we may fix w and assume $C\subset \operatorname {\mathrm {trop}}^{-1}(w)$ .

We first note that $\mathscr {L}(\pi )^{-1}(C) \subset \lvert \mathscr {L}(\mathcal {X})\rvert $ is measurable, by Theorem 7.1(a). Let $m \in \mathbb {Z}_{>0}$ and $q \in P$ be such that $\langle v, q \rangle = m$ for any first lattice point v of a ray of $\sigma $ . Let $j_w$ be as in the statement of Theorem 6.1(a), and let $\Theta _w$ be as in the statement of Theorem 7.1(a). By Theorem 6.1(b) and our choice of $j_w$ ,

$$ \begin{align*} \left(\mathbb{L}^{1/m}\right)^{j_w} \mu_X\left(\operatorname{\mathrm{trop}}^{-1}(w)\right) = \mu^{\mathrm{Gor}}_X\left(\operatorname{\mathrm{trop}}^{-1}(w)\right) = \mathbb{L}^{-d}(\mathbb{L}-1)^d \left(\mathbb{L}^{1/m}\right)^{- \left\langle w, q \right\rangle}. \end{align*} $$

In particular, $\mu _X\left (\operatorname {\mathrm {trop}}^{-1}(w)\right )$ is a unit in $\widehat {\mathscr {M}_k}\left [\mathbb {L}^{1/m}\right ]$ . Then by the foregoing equality, Theorem 7.1(b) and our choice of $\Theta _w$ ,

$$ \begin{align*} \left(\#\beta^{-1}(w)\right)\left(\mathbb{L}^{1/m}\right)^{j_w} \mu_X\left(\operatorname{\mathrm{trop}}^{-1}(w)\right) &= \left(\#\beta^{-1}(w)\right)\mathbb{L}^{-d}(\mathbb{L}-1)^d \left(\mathbb{L}^{1/m}\right)^{- \left\langle w, q \right\rangle}\\ &= \mu_{\mathcal{X}}\left(\mathscr{L}(\pi)^{-1}\left(\operatorname{\mathrm{trop}}^{-1}(w)\right)\right)\\ &= \Theta_w \mu_X\left(\operatorname{\mathrm{trop}}^{-1}(w)\right), \end{align*} $$

so

$$ \begin{align*} \Theta_w = \left(\#\beta^{-1}(w)\right)\left(\mathbb{L}^{1/m}\right)^{j_w}. \end{align*} $$

Therefore, by our choice of $\Theta _w$ and $j_w$ ,

$$ \begin{align*} \mu_{\mathcal{X}}\left(\mathscr{L}(\pi)^{-1}(C)\right) &= \Theta_w\mu_X(C)\\ &= \left(\#\beta^{-1}(w)\right)\left(\mathbb{L}^{1/m}\right)^{j_w} \mu_X(C)\\ &= \left(\#\beta^{-1}(w)\right) \mu^{\mathrm{Gor}}_X(C)\\ &= \int_C \operatorname{\mathrm{sep}}_\pi \mathrm{d}\mu^{\mathrm{Gor}}_X, \end{align*} $$

where the last equality is by Theorem 4.9.

9 Fantastacks with special stabilisers: Proof of Theorem 1.11

The goal of this section is to prove Theorem 9.1, which characterises when a fantastack has only special stabilisers, and then to use this characterisation to prove Theorem 1.11. For simplicity, we state the criterion Theorem 9.1 only in the case where the good moduli space is affine (and defined by a full-dimensional cone).

Throughout this section, set $d \in \mathbb {N}$ , let $N \cong \mathbb {Z}^d$ be a lattice and let $T = \operatorname {\mathrm {Spec}}(k[N^*])$ be the algebraic torus with cocharacter lattice N.

Theorem 9.1. Let $\mathcal {X}=\mathcal {F}_{\sigma ,\nu }$ be a fantastack with dense torus T and keep the notation listed in Definition 2.12. Then the following are equivalent:

  1. (i) The stabilisers of $\mathcal {X}$ are all special groups.

  2. (ii) For all $I \subset \{1, \dotsc , r\}$ , the set $\{\nu (e_i) \mid i \in I\}$ is linearly independent if and only if it can be extended to a basis for N.

  3. (iii) For some $n \in \mathbb {N}$ , we have $\mathcal {X}\cong \left [\mathbb {A}^r_k/\mathbb {G}_m^n\right ]$ , where $\mathbb {G}_m^n$ acts on $\mathbb {A}^r_k$ with weights $w_1,\dotsc ,w_r\in \mathbb {Z}^n$ such that for all $I \subset \{1, \dotsc , r\}$ , the set $\{w_i \mid i \in I\}$ is linearly independent if and only if it can be extended to a basis for $\mathbb {Z}^n$ .

The following is an immediate consequence of Theorem 9.1, noting that taking a canonical stack is compatible with taking products of toric varieties:

Corollary 9.2. Let $\sigma $ be a pointed rational cone in $N_{\mathbb {R}}$ , and let $\mathcal {X}$ be the canonical stack over $X_\sigma $ . If $v_1, \dotsc , v_r \in N$ are the first lattice points of the rays of $\sigma $ , then the following are equivalent:

  1. (i) The stabilisers of $\mathcal {X}$ are all special groups.

  2. (ii) For all $I \subset \{1, \dotsc , r \}$ , the set $\{v_i \mid i \in I\}$ is linearly independent if and only if it can be extended to a basis for N.

Before proving Theorem 9.1, we use Corollary 9.2 to prove Theorem 1.11.

Proof of Theorem 1.11

Let X be a toric variety over k, let $\pi : \mathcal {X} \to X$ be its canonical stack (see Remark 2.21) and assume that the stabilisers of $\mathcal {X}$ are all special groups. By Proposition 2.18 and the definition of $\operatorname {\mathrm {sep}}_\pi $ , we may assume that X is the affine T-toric variety defined by a pointed rational cone $\sigma $ in $N_{\mathbb {R}}$ . It is easy to check, for example by using Corollary 9.2, that because the stabilisers of $\mathcal {X}$ are all special groups, the cone $\sigma $ is a face of a d-dimensional pointed rational cone in $N_{\mathbb {R}}$ whose associated toric variety has a canonical stack with only special stabilisers. Therefore we may assume that $\sigma $ is d-dimensional and use the notation listed in Notation 2.19. Then by Proposition 2.15, Theorem 4.9 and the fact that

$$ \begin{align*} \mu_X\left( \mathscr{L}(X) \setminus \bigcup_{w \in \sigma \cap N} \operatorname{\mathrm{trop}}^{-1}(w) \right) = \mu_X\left( \mathscr{L}(X \setminus T) \right) = 0, \end{align*} $$

it is sufficient to show that $\beta $ is surjective.

Set $w \in \sigma \cap N$ . We will use Corollary 9.2 to show that w is in the image of $\beta $ . Let $\Sigma $ be a simplicial subdivision of $\sigma $ whose rays are all rays of $\sigma $ , and let $\sigma _w \in \Sigma $ be a cone containing w. By Corollary 9.2, the cone $\sigma _w$ is unimodular, so w is a positive integer combination of first lattice points of rays of $\sigma $ . Therefore w is in the image of $\beta $ by the definition of $\beta $ , and we are done.

The remainder of this paper will be used to prove Theorem 9.1.

9.1 A combinatorial criterion for special stabilisers

We start with some preliminary results, the first of which is a standard fact.

Lemma 9.3. If A and B are finite-rank lattices and

$$ \begin{align*} 0\to A\xrightarrow{f} B\to C\to 0 \end{align*} $$

is a short exact sequence, then $\operatorname {\mathrm {cok}}(f^*)$ is finite. Moreover, C is torsion-free if and only if $f^*$ is surjective.

Proof. Letting $C_{\operatorname {\mathrm {tor}}}$ be the torsion part of C, applying $\operatorname {\mathrm {Hom}}(-,\mathbb {Z})$ to the short exact sequence

$$ \begin{align*} 0\to C_{\operatorname{\mathrm{tor}}}\to C\to \overline{C}\to 0, \end{align*} $$

we see that $\operatorname {\mathrm {Ext}}^1(C,\mathbb {Z})\cong \operatorname {\mathrm {Ext}}^1(C_{\operatorname {\mathrm {tor}}},\mathbb {Z})$ , which is finite. Then from the exact sequence

$$ \begin{align*} 0\to C^*\to B^*\xrightarrow{f^*} A^*\to \operatorname{\mathrm{Ext}}^1(C,\mathbb{Z})\to 0, \end{align*} $$

we see that $\operatorname {\mathrm {cok}}(f^*)$ is finite and that $f^*$ is surjective if and only if $\operatorname {\mathrm {Ext}}^1(C,\mathbb {Z})=0$ if and only if C is a lattice.

Lemma 9.4. Let A be a lattice and suppose $v_1,\dotsc ,v_r\in A$ span $A_{\mathbb {Q}}$ . Then the following conditions are equivalent:

  1. 1. $A/\sum _{i\in S}\mathbb {Z} v_i$ is torsion-free for all $S\subseteq \{1,\dotsc ,r\}$ .

  2. 2. For every $S\subseteq \{1,\dotsc ,r\}$ , if $\{v_i\mid i\in S\}$ is a $\mathbb {Q}$ -basis for $A_{\mathbb {Q}}$ , then it is a $\mathbb {Z}$ -basis for A.

Proof. To ease notation, define $L_S:=\sum _{i\in S}\mathbb {Z} v_i$ and $L^{\operatorname {\mathrm {sat}}}_S:=A\cap (L_S)_{\mathbb {Q}}$ for all $S\subseteq \{1,\dotsc ,r\}$ . Note that $A/L^{\operatorname {\mathrm {sat}}}_S$ is torsion-free, so $L^{\operatorname {\mathrm {sat}}}_S$ is a direct summand of A. It follows that $A/L_S$ is torsion-free if and only if $L^{\operatorname {\mathrm {sat}}}_S/L_S$ is torsion-free, and since $L^{\operatorname {\mathrm {sat}}}_S/L_S$ is finite, we see that condition (1) is equivalent to $L_S=L^{\operatorname {\mathrm {sat}}}_S$ .

Now suppose that condition (1) holds and set $S\subseteq \{1,\dotsc ,r\}$ such that $\{v_i\mid i\in S\}$ is a $\mathbb {Q}$ -basis for $A_{\mathbb {Q}}$ . Then $L_S=L^{\operatorname {\mathrm {sat}}}_S=A$ , so $\{v_i\mid i\in S\}$ is a $\mathbb {Z}$ -basis for A.

Conversely, suppose condition (2) holds, and let $S\subseteq \{1,\dotsc ,r\}$ be any subset. Choose $S'\subseteq S$ such that $\{v_i\mid i\in S'\}$ form a $\mathbb {Q}$ -basis for $(L_S)_{\mathbb {Q}}$ . Since the $\mathbb {Q}$ -span of $v_1,\dotsc ,v_r$ is $A_{\mathbb {Q}}$ , we can choose $S''\subseteq \{1,\dotsc ,r\}\setminus S$ such that $\{v_i\mid i\in S'\cup S''\}$ form a $\mathbb {Q}$ -basis for $A_{\mathbb {Q}}$ . It follows that $\{v_i\mid i\in S'\cup S''\}$ is a $\mathbb {Z}$ -basis for A, and hence $A\cong L_{S'}\oplus L_{S''}$ .

To show that condition (1) holds – that is, $A/L_S$ is torsion-free – it thus suffices to show $L_{S'}=L_S$ . To see why this equality holds, set $j\in S$ and write $v_j=\sum _{i\in S'}a^{\prime }_iv_i+\sum _{i\in S''}a^{\prime \prime }_iv_i$ , with $a^{\prime }_i,a^{\prime \prime }_i\in \mathbb {Z}$ . On the other hand, by the definition of $S'$ , we can write $v_j=\sum _{i\in S'}b^{\prime }_iv_i$ , with $b^{\prime }_i\in \mathbb {Q}$ . Equating our two expressions and using the fact that $\{v_i\mid i\in S'\cup S''\}$ is a $\mathbb {Q}$ -basis for $A_{\mathbb {Q}}$ , we see that $a^{\prime \prime }_i=0$ for all $i\in S''$ . So $v_j\in L_{S'}$ .

Lemma 9.5. Let $\mathcal {X}=\left [\mathbb {A}^r_k/\mathbb {G}_m^n\right ]$ , where $\mathbb {G}_m^n$ acts with weights $w_1,\dotsc ,w_r\in \mathbb {Z}^n$ which span $\mathbb {Q}^n$ .Footnote 2 Then $\mathcal {X}$ has special stabilisers if and only if for every $S\subseteq \{1,\dotsc ,r\}$ , if $\{w_i\mid i\in S\}$ is a $\mathbb {Q}$ -basis for $\mathbb {Q}^n$ , then it is a $\mathbb {Z}$ -basis for $\mathbb {Z}^n$ .

Proof. Since the stabilisers of $\mathcal {X}$ are subgroups of $\mathbb {G}_m^n$ , they are special if and only if they are connected. Let $w_i=(a_{i1},\dotsc ,a_{in})\in \mathbb {Z}^n$ . Given a point $x=(x_1,\dotsc ,x_r)\in \mathbb {A}^r_k$ , let $S_x=\{i\mid x_i\neq 0\}$ . Then the stabiliser $G_x$ of x is the set of $(\lambda _1,\dotsc ,\lambda _n)\in \mathbb {G}_m^n$ such that $\prod _{j=1}^n\lambda _j^{a_{ij}}=1$ for all $i\in S_x$ . In other words, we have a short exact sequence

$$ \begin{align*} 1\to G_x\to \mathbb{G}_m^n\xrightarrow{\varphi} \mathbb{G}_m^{S_x}\to1, \end{align*} $$

where for $i\in S_x$ , the ith coordinate of $\varphi (\lambda _1,\dotsc ,\lambda _n)$ is given by $\prod _{j=1}^n\lambda _j^{a_{ij}}$ . Taking Cartier duals $D(-):=\operatorname {\mathrm {Hom}}(-,\mathbb {G}_m)$ , we see that $D(G_x)$ is the cokernel of the map $\mathbb {Z}^{S_x}\to \mathbb {Z}^n$ sending the ith standard basis vector to $w_i$ . By Cartier duality, $G_x$ is connected if and only if $D(G_x)$ is torsion-free. We have thus shown that $\mathcal {X}$ has connected stabilisers if and only if $\mathbb {Z}^n/\sum _{i\in S}\mathbb {Z} w_i$ is torsion-free for all subsets $S\subseteq \{1,\dotsc ,r\}$ . Lemma 9.4 then finishes the proof.

We now turn to Theorem 9.1.

Proof of Theorem 9.1

The map $\nu \colon \mathbb {Z}^r\to N$ has finite cokernel, or equivalently, $\nu ^*$ is injective. So we have a short exact sequence

By the construction of fantastacks, we have $\mathcal {X}=\left [\mathbb {A}^r_k/G\right ]$ , where G is the Cartier dual of A. Note that G is the stabiliser of the origin, and it is connected if and only if A is torsion-free. By Lemma 9.3, this is equivalent to surjectivity of $\nu $ .

So we may now assume $\nu $ is surjective, and in light of Lemma 9.5, we need only establish the equivalence of conditions (ii) and (iii). By Lemma 9.4, condition (ii) holds if and only if $\operatorname {\mathrm {cok}}\left (\nu \rvert _{\mathbb {Z}^S}\right )$ is torsion-free for all subsets $S\subseteq \{1,\dotsc ,r\}$ . Letting $e_i^*\in (\mathbb {Z}^r)^*$ denote the dual linear functional, notice that $\alpha \left (e_i^*\right )$ is the ith weight for the G-action on $\mathbb {A}^r_k$ . Given any subset $S\subseteq \{1,\dotsc ,r\}$ , we let $S'$ denote the complement of S. We have a natural inclusion $\left (\mathbb {Z}^{S'}\right )^*\subseteq (\mathbb {Z}^r)^*$ with cokernel $\left (\mathbb {Z}^S\right )^*$ . Another application of Lemma 9.4 shows that condition (iii) holds if and only if $Q_S:=A/\alpha \left (\left (\mathbb {Z}^{S'}\right )^*\right )$ is torsion-free for all S. We show that this latter condition is equivalent to $\operatorname {\mathrm {cok}}\left (\nu \rvert _{\mathbb {Z}^S}\right )$ being torsion-free for all subsets $S\subseteq \{1,\dotsc ,r\}$ .

Consider the diagram

where B is the image of $\pi \circ \nu ^*$ and $C=\left (\mathbb {Z}^{S'}\right )^*\cap \ker \alpha $ ; in particular, all rows and columns are exact. Note that all $\mathbb {Z}$ -modules in this diagram are torsion-free, with the possible exception of $Q_S$ . Applying $\operatorname {\mathrm {Hom}}(-,\mathbb {Z})$ , we have the diagram

where all rows are exact and all vertical maps are injective. We see then that

$$ \begin{align*} \operatorname{\mathrm{cok}}\left(\nu\rvert_{\mathbb{Z}^S}\right)=\operatorname{\mathrm{Ext}}^1(Q_S,\mathbb{Z}). \end{align*} $$

Letting $Q_{S,\operatorname {\mathrm {tor}}}\subseteq Q_S$ denote the torsion part, we have $\operatorname {\mathrm {Ext}}^1(Q_S,\mathbb {Z})=\operatorname {\mathrm {Ext}}^1\left (Q_{S,\operatorname {\mathrm {tor}}},\mathbb {Z}\right )$ , which is finite, so $\operatorname {\mathrm {cok}}\left (\nu \rvert _{\mathbb {Z}^S}\right )$ is torsion-free if and only if $\operatorname {\mathrm {Ext}}^1(Q_S,\mathbb {Z})=0$ if and only if $Q_S$ is torsion-free.

10 Quotients by $\mathrm {SL}_2$ and cones over Grassmannians

Until now, we have only considered stacks with abelian stabilisers. In this section, we verify Conjecture 1.1 and Conjecture 1.2 for nontrivial examples where the stabilisers are nonabelian. Our primary running example in this section is a stack $\mathcal {X}=\left [\mathbb {A}^8/\mathrm {SL}_2\right ]$ whose good moduli space is the affine cone over the Grassmannian $\operatorname {\mathrm {Gr}}(2,4)$ with respect to the Plücker embedding; we will additionally verify Conjecture 1.2 and answer Question 1.4 for a stack $\mathcal {X}=\left [\mathbb {A}^{2r}/\mathrm {SL}_2\right ]$ whose good moduli space is the affine cone over the Grassmannian $\operatorname {\mathrm {Gr}}(2,r)$ . The cases we consider are particularly interesting because, unlike fantastacks, we show here that $\mu _X\left (\operatorname {\mathrm {sep}}_\pi ^{-1}(\infty )\right ) \neq 0$ .

We begin by setting up some notation. Throughout this section, fix some $r \in \mathbb {Z}_{>1}$ and let $[r]=\{1,\dotsc ,r\}$ . Let $\widetilde {X}=\mathbb {A}^{2\times r}$ , which we think of as $2\times r$ matrices with coordinates

$$ \begin{align*} \begin{pmatrix} y_{1,1} & \dotsb & y_{1,r} \\ y_{2,1} & \dotsb & y_{2,r} \end{pmatrix}. \end{align*} $$

There is an $\mathrm {SL}_2$ -action on $\widetilde {X}$ given by left multiplication. The invariant functions are generated by the $2\times 2$ minors, and so the quotient $X=\widetilde {X}/\mathrm {SL}_2\subset \mathbb {A}^{[r] \choose 2}_k$ is the affine cone over the Grassmannian $\operatorname {\mathrm {Gr}}(2, r)$ with respect to the Plücker embedding of $\operatorname {\mathrm {Gr}}(2,r)$ . Letting $\left \{x_{\ell ,m}\mid 1\leq \ell < m\leq r\right \}$ be the coordinates on $\mathbb {A}^{[r] \choose 2}_k$ , the quotient map $\widetilde {X}\to X$ sends each $x_{\ell ,m}\rvert _X$ to the $(\ell , m)$ th minor of the matrix. Set $\mathcal {X} = \left [ \widetilde {X} / \mathrm {SL}_2 \right ]$ , let $\rho : \widetilde {X} \to \mathcal {X}$ be the quotient map and let $\pi \colon \mathcal {X}\to X$ be the good moduli space map. Note that all stabilisers of $\mathcal {X}$ are special: the zero matrix has stabiliser $\mathrm {SL}_2$ , a full-rank matrix has trivial stabiliser and a rank $1$ matrix has stabiliser $\mathbb {G}_a$ .

Remark 10.1. When $r \geq 3$ , the exceptional locus of $\pi $ has codimension at least $2$ : it is straightforward to check that if $U \subset X$ is the intersection of X with the complement $\mathbb {G}_m^{[n] \choose 2}$ of the coordinate axes of $\mathbb {A}_k^{[n] \choose 2}$ , then $\pi \rvert _{\pi ^{-1}(U)}: \pi ^{-1}(U) \to U$ is an isomorphism; and when $r \geq 3$ , the complement of $\pi ^{-1}(U)$ in $\mathcal {X}$ has codimension at least $2$ .

The next two propositions verify Conjecture 1.2 and answer Question 1.4.

Proposition 10.2. For $r\geq 2$ , Conjecture 1.2 holds for $\pi \colon \mathcal {X}\to X$ .

Proposition 10.3. For $r\geq 2$ , we have $\mu _X\left (\operatorname {\mathrm {sep}}_\pi ^{-1}(\infty )\right ) \neq 0$ , answering Question 1.4 for $\pi \colon \mathcal {X}\to X$ .

For any $\mathbf {w} \in (\mathbb {N} \cup \{\infty \})^{[r] \choose 2}$ , let $C^{(\mathbf {w})} \subset \mathscr {L}(X)$ denote the subset of arcs whose prescribed vanishing orders with respect to the Plücker coordinate are given by $\mathbf {w}$ . More precisely,

$$ \begin{align*} C^{(\mathbf{w})} = \bigcap_{\ell< m \in [r]} \operatorname{\mathrm{ord}}_{x_{\ell,m} \rvert_X}^{-1}\left(w_{\ell,m}\right) \subset \mathscr{L}(X). \end{align*} $$

Note that if $\mathbf {w} \in \mathbb {N}^{[r] \choose 2}$ , then $C^{(\mathbf {w})}$ is a cylinder.

Remark 10.4. If $\mathbf {w} \in \left ( (\mathbb {N} \cup \{\infty \})^{[r] \choose 2} \setminus \mathbb {N}^{[r] \choose 2}\right )$ , then $C^{(\mathbf {w})}$ is a measurable set with $\mu _X\left (C^{(\mathbf {w})}\right ) = 0$ .

With this notation, we now prove Proposition 10.2 and Proposition 10.3.

Proof of Proposition 10.2

It suffices to show that away from a set of measure $0$ , every arc $\varphi \in \mathscr {L}(X)(k')$ lifts to an arc in $\mathscr {L}(\mathcal {X})(k')$ , where $k'$ is an extension field of k. By Remark 10.4, we may assume $\varphi \in C^{(\mathbf {w})}$ with $\mathbf {w} =\left (w_{i,j}\right ) \in \mathbb {N}^{[r] \choose 2}$ . Without loss of generality, we may additionally assume $w_{1,2}=\min \left (w_{i,j}\right )$ . Let the map on coordinate rings induced by send $x_{i,j}\rvert _X$ to . Let $\widetilde \psi \in \mathscr {L}\left (\widetilde {X}\right )$ be the arc given by the matrix

(3) $$ \begin{align} \begin{pmatrix} g_{1,2} & 0 & -g_{2,3} & -g_{2,4} & \dotsb & -g_{2,r} \\ 0 & 1 & g_{1,3}g_{1,2}^{-1} & g_{1,4}g_{1,2}^{-1} & \dotsb & g_{1,r}g_{1,2}^{-1} \end{pmatrix}. \end{align} $$

Note that all $g_{i,j}$ are nonzero, since $\mathbf {w} \in \mathbb {N}^{[r] \choose 2}$ , and all entries of the matrix are in , since $w_{1,2}=\min \left (w_{i,j}\right )$ . Note further that the $(i,j)$ th minor of the matrix is precisely $g_{i,j}$ ; this is clear when $i\in \{1,2\}$ , so the Plücker relations ensure that it remains true for all $(i,j)$ . As a result, $\widetilde \psi $ is a lift of $\varphi $ , and hence $\psi =\mathscr {L}(\rho )\left (\widetilde \psi \right )\in \mathscr {L}(\mathcal {X})$ is a lift of $\varphi $ .

Proof of Proposition 10.3

As in the proof of Proposition 10.2, it suffices to show that $\operatorname {\mathrm {sep}}_\pi $ is infinite on $C^{(\mathbf {w})}$ under the assumption that $\mathbf {w} =\left (w_{i,j}\right ) \in \mathbb {N}^{[r] \choose 2}$ and $1\leq w_{1,2}=\min \left (w_{i,j}\right )$ . Again, set $\varphi \in C^{(\mathbf {w})}$ and let send $x_{i,j}\rvert _X$ to . Then for any , we obtain a lift $\widetilde \psi _h\in \mathscr {L}\left (\widetilde {X}\right )$ of $\varphi $ , where $\widetilde \psi _h$ is the arc given by the matrix

$$ \begin{align*} \begin{pmatrix} g_{1,2} & 0 & -g_{2,3} & -g_{2,4} & \dotsb & -g_{2,r} \\ h & 1 & \left(g_{1,3}-hg_{2,3}\right)g_{1,2}^{-1} & \left(g_{1,4}-hg_{2,4}\right)g_{1,2}^{-1} & \dotsb & \left(g_{1,r}-hg_{2,r}\right)g_{1,2}^{-1} \end{pmatrix}. \end{align*} $$

Notice that for any for which $h'-h$ is not divisible by $t^{w_{1,2}}$ , there is no for which $A\widetilde \psi _h=\widetilde \psi _{h'}$ . Indeed, the unique with

$$ \begin{align*} A\begin{pmatrix} g_{1,2} & 0 \\ h & 1\end{pmatrix}=\begin{pmatrix} g_{1,2} & 0 \\ h' & 1\end{pmatrix} \end{align*} $$

is given by

$$ \begin{align*} A=\begin{pmatrix} 1 & 0 \\ (h'-h)g_{1,2}^{-1} & 1\end{pmatrix}, \end{align*} $$

which is not in , by the assumption on $h'-h$ . Noting that $w_{1,2} \geq 1$ , it follows that $\operatorname {\mathrm {sep}}_\pi $ is infinite on $C^{(\mathbf {w})}$ .

There are two features of the proof of Proposition 10.2 that we wish to highlight. First, for the matrices in expression (3) to define arcs of $\mathscr {L}(\mathcal {X})$ , we needed not $w_{1,2}=\min \left (w_{i,j}\right )$ but rather $w_{1,2} \leq w_{1,3}, \dotsc , w_{1, r}, w_{2,3}, \dotsc , w_{2,r}$ . Second, for any $i\leq w_{1,2}$ we have many more lifts of $\varphi $ given by matrices of the form

$$ \begin{align*} \begin{pmatrix} g_{1,2}t^{-i} & 0 & -g_{2,3}t^{-i} & -g_{2,4}t^{-i} & \dotsb & -g_{2,r}t^{-i} \\ 0 & t^i & g_{1,3}g_{1,2}^{-1}t^i & g_{1,4}g_{1,2}^{-1}t^i & \dotsb & g_{1,r}g_{1,2}^{-1}t^i \end{pmatrix}. \end{align*} $$

With this as motivation, we introduce the following sets. For any $i, w_{1,2} \in \mathbb {N}$ and $\mathbf {w}_1 = \left (w_{1,3}, \dotsc , w_{1,r}\right ), \mathbf {w}_2 = \left (w_{2,3}, \dotsc , w_{2, r}\right ) \in \mathbb {N}^{r-2}$ satisfying

(⋆) $$ \begin{align} 2i \leq w_{1,2} \leq w_{1,3}, \dotsc, w_{1, r}, w_{2,3}, \dotsc, w_{2,r}, \end{align} $$

let $Z^{\left (i, w_{1,2}, \mathbf {w}_1, \mathbf {w}_2\right )}$ be the subset of $\mathscr {L}\left (\widetilde {X}\right )$ whose $k'$ -valued points, for any extension $k'$ of k, are the $2 \times r$ matrices of the form

$$ \begin{align*} \begin{pmatrix} f_{1,1} & 0 & f_{1,3} & f_{1,4} & \dotsb & f_{1,r} \\ 0 & t^i & f_{2,3} & f_{2,4} & \dotsb & f_{2,r} \end{pmatrix}, \end{align*} $$

where satisfies

$$ \begin{align*} \operatorname{\mathrm{ord}}_t\left(f_{1,1}\right) &= w_{1,2} - i,\\ \operatorname{\mathrm{ord}}_t\left(f_{1,j}\right) &= w_{2,j} - i, & \text{for all }j = 3, \dotsc, r,\\ \operatorname{\mathrm{ord}}_t\left(f_{2,j}\right) &= w_{1,j} - w_{1,2} + i, & \text{for all }j = 3, \dotsc, r. \end{align*} $$

Note that the condition () guarantees that these vanishing orders are nonnegative. For any $i, w_{1,2} \in \mathbb {N}$ and $\mathbf {w}_1, \mathbf {w}_2 \in \mathbb {N}^{r-2}$ satisfying (), set

$$ \begin{align*} \mathcal{C}^{\left(i, w_{1,2}, \mathbf{w}_1, \mathbf{w}_2\right)} = \mathscr{L}(\rho)\left(Z^{\left(i, w_{1,2}, \mathbf{w}_1, \mathbf{w}_2\right)}\right) \subset \lvert\mathscr{L}(\mathcal{X})\rvert \end{align*} $$

and set

$$ \begin{align*} C^{\left(w_{1,2}, \mathbf{w}_1, \mathbf{w}_2\right)} = \bigcup_{\mathbf{w}} C^{(\mathbf{w})}, \end{align*} $$

where $\mathbf {w}$ varies over all elements of $(\mathbb {N} \cup \{\infty \})^{[r] \choose 2}$ whose $(\ell , m)$ th entry is equal to $w_{\ell , m}$ for all $(\ell , m) = (1,2), (1,3), \dotsc , (1,r), (2,3), \dotsc , (2,r)$ .

Last, although (for ease of notation) we have chosen to define all of these sets with $w_{1,2}$ playing a special role, by symmetry of the Plücker coordinates, we obtain many analogous sets as follows. Note that there is a natural $S_r$ -action on $\mathcal {X}$ given by permuting columns of the matrices in $\widetilde {X}$ ; by functoriality, this descends to an $S_r$ -action on the good moduli space X. Let

$$ \begin{align*} \mathcal{C}^{\left(i, w_{1,2}, \mathbf{w}_1, \mathbf{w}_2\right)}_\sigma = \sigma\left(\mathcal{C}^{\left(i, w_{1,2}, \mathbf{w}_1, \mathbf{w}_2\right)}\right) \subset \lvert\mathscr{L}(\mathcal{X})\rvert\qquad\textrm{and}\qquad C^{\left(w_{1,2}, \mathbf{w}_1, \mathbf{w}_2\right)}_\sigma=\sigma\left(C^{\left(w_{1,2}, \mathbf{w}_1, \mathbf{w}_2\right)}\right)\subset\mathscr{L}(X). \end{align*} $$

Definition 10.5. Let $\mathcal {S}'$ be the collection of pairs

$$ \begin{align*} \left(\mathcal{C}^{\left(i, w_{1,2}, \mathbf{w}_1, \mathbf{w}_2\right)}_\sigma,C^{\left(w_{1,2}, \mathbf{w}_1, \mathbf{w}_2\right)}_\sigma\right) \end{align*} $$

with $i, w_{1,2} \in \mathbb {N}$ and $\mathbf {w}_1, \mathbf {w}_2 \in \mathbb {N}^{r-2}$ satisfying (), and $\sigma \in S_r$ . Let $\mathcal {S}\subset \mathcal {S}'$ be the subset consisting of pairs where $i>0$ .

Remark 10.6. Since the $S_r$ -actions on $\mathscr {L}(\mathcal {X})$ and $\mathscr {L}(X)$ are measure-preserving, to prove Conjecture 1.1 for $\left (\mathcal {C}^{\left (i, w_{1,2}, \mathbf {w}_1, \mathbf {w}_2\right )}_\sigma ,C^{\left (w_{1,2}, \mathbf {w}_1, \mathbf {w}_2\right )}_\sigma \right )$ it is enough to prove the conjecture for $\left (\mathcal {C}^{\left (i, w_{1,2}, \mathbf {w}_1, \mathbf {w}_2\right )},C^{\left (w_{1,2}, \mathbf {w}_1, \mathbf {w}_2\right )}\right )$ .

The next proposition verifies Conjecture 1.1 for an infinite collection of pairs $(\mathcal {C}, C)$ such that the C cover $\mathscr {L}(X)$ up to measure $0$ . Our collection of $(\mathcal {C},C)$ involves nonabelian stabilisers in a nontrivial way by the fourth bullet point in the proposition. Furthermore, for every C we prove Conjecture 1.1 for multiple different choices of $\mathcal {C}$ , thereby illustrating the flexibility of the conjecture in choosing $\mathcal {C}$ .

Proposition 10.7. Set $r\in \{3,4\}$ and let $\mathcal {S} \subset \mathcal {S}'$ be the collections of measurable subsets of $\lvert \mathscr {L}(\mathcal {X})\rvert \times \mathscr {L}(X)$ given in Definition 10.5. Then

  • $\mathcal {S}$ is an infinite set;

  • for all $(\mathcal {C}, C) \in \mathcal {S}'$ , the measurable sets $\mathcal {C}$ and C both have nonzero measure;

  • the complement of $\bigcup _{\left (\mathcal {C},C\right )\in \mathcal {S}'}C$ has measure $0$ ;

  • for all $(\mathcal {C},C)\in \mathcal {S}$ , every $\psi \in \mathcal {C}$ has special point mapping to the point with $\mathrm {SL}_2$ stabiliser;

  • $C= \mathscr {L}(\pi )(\mathcal {C})$ for all $(\mathcal {C},C)\in \mathcal {S}'$ ; and

  • Conjecture 1.1 holds for all $(\mathcal {C},C)\in \mathcal {S}'$ – that is,

    $$ \begin{align*} \mu_{\mathcal{X}}(\mathcal{C}) = \mu_{\mathcal{X}}\left(\mathcal{C} \cap \mathscr{L}(\pi)^{-1}(C)\right) = \int_C \operatorname{\mathrm{sep}}_{\pi, \mathcal{C}} \mathrm{d}\mu^{\mathrm{Gor}}_X. \end{align*} $$

Remark 10.8. By definition, for every $(\mathcal {C},C)\in \mathcal {S}$ and $\psi \in \mathcal {C}$ the matrix corresponding to $\psi $ specialises to the $0$ matrix. As a result, the special point of $\psi $ maps to the point in $\mathcal {X}$ with $\mathrm {SL}_2$ stabiliser, justifying the fourth bullet point of Proposition 10.7.

The remainder of this section is concerned with the proof of Proposition 10.7. To compute $\mu ^{\mathrm {Gor}}_X\left (C^{\left (w_{1,2}, \mathbf {w}_1, \mathbf {w}_2\right )}\right )$ , it is enough to compute $\mu ^{\mathrm {Gor}}_X\left (C^{(\mathbf {w})}\right )$ , which is done in Proposition 10.9 (the only result in this section where we impose $r\in \{3,4\}$ as opposed to $r\geq 2$ ).

Proposition 10.9.

  1. (a) Suppose $r = 3$ , and set $\mathbf {w} = \left (w_{1,2}, w_{1,3}, w_{2,3}\right ) \in \mathbb {N}^{[r] \choose 2}$ . Then X is smooth, and

    $$ \begin{align*} \mu^{\mathrm{Gor}}_X\left(C^{(\mathbf{w})}\right) = (\mathbb{L}-1)^3\mathbb{L}^{-3-w_{1,2} - w_{1,3} - w_{2,3}}. \end{align*} $$
  2. (b) Suppose $r = 4$ , set $\mathbf {w} = \left (w_{1,2}, w_{3,4}, w_{1,3}, w_{2,4}, w_{1,4}, w_{2,3}\right ) \in \mathbb {N}^{[r] \choose 2}$ and set

    $$ \begin{align*} m &= \min\left(w_{1,2} + w_{3,4}, w_{1,3} + w_{2,4}, w_{1,4} + w_{2,3}\right),\\ j &= -5+ m - w_{1,2} - w_{3,4} - w_{1,3} - w_{2,4} - w_{1,4} - w_{2,3}. \end{align*} $$
    Then X has log-terminal singularities, and

Proof.

  1. (a) This is immediate from the fact that $X = \mathbb {A}_k^{[3] \choose 2}$ .

  2. (b) We only sketch the proof, as the details are somewhat extensive but do not involve any novel ideas. We have that X is defined in $\mathbb {A}_k^{[4] \choose 2}$ by the vanishing of a single polynomial $x_{1,2}x_{3,4} - x_{1,3}x_{2,4} + x_{1,4}x_{2,3}$ . This polynomial is nondegenerate with respect to its Newton polyhedron, so the claim follows from standard techniques: a certain toric modification of $\mathbb {A}_k^{[4] \choose 2}$ gives a resolution of X (see, for example, [Reference Schepers and VeysSV09], especially the discrepancy computation in the proof of [Reference Schepers and VeysSV09, Proposition 2.3]). Note that to get our claim from these techniques, one needs to verify that $\mathrm {e}\left (X \cap \mathbb {G}_m^{[4] \choose 2}\right ) = (\mathbb {L}-1)^3(\mathbb {L}-2)$ , which, for example, follows from the relationship between $X \cap \mathbb {G}_m^{[4] \choose 2}$ and the realisation space of the rank $2$ uniform matroid on four elements (see, for example, [Reference KatzKat16, Proposition 9.7]), which has class $\mathbb {L}-2$ .

We next turn to the computation of $\mu _{\mathcal {X}}\left (\mathcal {C}^{\left (i, w_{1,2}, \mathbf {w}_1, \mathbf {w}_2\right )}\right )$ . This is the technical heart of this section.

Proposition 10.10. Let $i, w_{1,2} \in \mathbb {N}$ and $\mathbf {w}_1 = \left (w_{1,3}, \dotsc , w_{1,r}\right )$ , $\mathbf {w}_2 = \left (w_{2,3}, \dotsc , w_{2, r}\right )$ satisfy (). Then $\mathcal {C}^{\left (i, w_{1,2}, \mathbf {w}_1, \mathbf {w}_2\right )}$ is a cylinder in $\lvert \mathscr {L}_n(\mathcal {X})\rvert $ and

$$ \begin{align*} \mu_{\mathcal{X}}\left(\mathcal{C}^{\left(i, w_{1,2}, \mathbf{w}_1, \mathbf{w}_2\right)}\right) = (\mathbb{L}-1)^{2r-3} \mathbb{L}^{-(2r-3)+(r-4)w_{1,2}-\left(w_{1,3} + \dotsb + w_{1,r} + w_{2,3} + \dotsb + w_{2,r}\right)}. \end{align*} $$

Proof. To ease notation, set $Z = Z^{\left (i, w_{1,2}, \mathbf {w}_1, \mathbf {w}_2\right )}$ and $\mathcal {C} = \mathcal {C}^{\left (i, w_{1,2}, \mathbf {w}_1, \mathbf {w}_2\right )}$ . For any $n \in \mathbb {N}$ , let $Z_n$ be the locally closed subscheme of $\mathscr {L}_n\left (\widetilde {X}\right )$ whose A-valued points, for any k-algebra A, are the $2 \times r$ matrices of the form

$$ \begin{align*} \begin{pmatrix} u_{1,1} t^{w_{1,2} - i} & 0 & u_{1,3} t^{w_{2,3} - i} & u_{1,4} t^{w_{2,4} - i} & \dotsb & u_{1,r} t^{w_{2,r} - i} \\ 0 & t^i & u_{2,3}t^{w_{1,3} - w_{1,2} + i} & u_{2,4}t^{w_{1,4} - w_{1,2} + i} & \dotsb & u_{2,r}t^{w_{1,r} - w_{1,2} + i} \end{pmatrix}, \end{align*} $$

where $u_{1,1}, u_{1,3}, \dotsc , u_{1, r}, u_{2,3}, \dotsc , u_{2, r}$ are all units in $A[t]/\left (t^{n+1}\right )$ ; so by construction,

$$ \begin{align*} Z_n = \theta_n(Z). \end{align*} $$

Thus for any $n \in \mathbb {N}$ ,

(4) $$ \begin{align} \theta_n(\mathcal{C}) = \mathscr{L}_n(\rho)(Z_n). \end{align} $$

Now set $n_0 = \max \left (w_{1,2}, i, w_{2,3}, \dotsc , w_{2, r}, w_{1,3} + i, \dotsc , w_{1,r} + i\right )$ . We will show that

$$ \begin{align*} \mathcal{C} = \theta_{n_0}^{-1}\left( \mathscr{L}_{n_0}(\rho)\left(Z_{n_0}\right) \right). \end{align*} $$

One inclusion is clear from equation (4). To show the other inclusion, let $k'$ be a field extension of k and $\psi $ be a $k'$ -point of $\theta _{n_0}^{-1}\left ( \mathscr {L}_{n_0}(\rho )\left (Z_{n_0}\right ) \right )$ . For the sake of showing the desired inclusion, we may extend $k'$ , so we may assume there exists a $k'$ -point $\widetilde {\psi }_{n_0}$ of $Z_{n_0}$ such that $\mathscr {L}_n(\rho )\left (\widetilde {\psi }_{n_0}\right ) \cong \theta _{n_0}(\psi )$ . Because $\rho : \widetilde {X} \to \mathcal {X}$ is smooth, there exists a $k'$ -point $\widetilde {\psi }$ of $\mathscr {L}\left (\widetilde {X}\right )$ such that $\theta _{n_0}\left (\widetilde {\psi }\right ) = \widetilde {\psi }_{n_0}$ and $\mathscr {L}(\rho )\left (\widetilde {\psi }\right ) \cong \psi $ . We want to show that there exists some such that $g \cdot \widetilde {\psi } \in Z$ , as this would imply that $\psi \cong \mathscr {L}(\rho )\left (\widetilde {\psi }\right ) \cong \mathscr {L}(\rho )\left (g \cdot \widetilde {\psi }\right ) \in \mathscr {L}(\rho )(Z) = \mathcal {C}$ . By our choice of $n_0$ and the fact that $\theta _{n_0}\left (\widetilde {\psi }\right ) \in Z_{n_0}$ , the arc $\tilde {\psi }$ is equal to

$$ \begin{align*} \begin{pmatrix} f_{1,1} & h_{1,2}t^{n_0+1} & f_{1,3} & f_{1,4} & \dotsb & f_{1,r} \\ h_{2,1}t^{n_0+1} & t^i + h_{2,2}t^{n_0+1} & f_{2,3} & f_{2,4} & \dotsb & f_{2,r} \end{pmatrix}, \end{align*} $$

for some and some satisfying

$$ \begin{align*} \operatorname{\mathrm{ord}}_t\left(f_{1,1}\right) &= w_{1,2} - i,\\ \operatorname{\mathrm{ord}}_t\left(f_{1,j}\right) &= w_{2,j} - i, &\text{for all } j = 3, \dotsc, r,\\ \operatorname{\mathrm{ord}}_t\left(f_{2,j}\right) &= w_{1,j} - w_{1,2} + i, &\text{for all } j = 3, \dotsc, r. \end{align*} $$

Let be the $(1,2)$ th minor of $\widetilde {\psi }$ . We have $h \neq 0$ , because h and $f_{1,1}t^i$ have the same image in $k'[t]/\left (t^{n_0+1}\right )$ , and the latter image is nonzero by $n_0 \geq w_{1,2}$ . Thus there exists some such that

$$ \begin{align*} g \cdot \begin{pmatrix} f_{1,1} & h_{1,2}t^{n_0+1} \\ h_{2,1}t^{n_0+1} & t^i + h_{2,2}t^{n_0+1} \end{pmatrix} = \begin{pmatrix} ht^{-i} & 0 \\ 0 & t^i \end{pmatrix}. \end{align*} $$

Then

$$ \begin{align*} g^{-1} = \begin{pmatrix} f_{1,1} & h_{1,2}t^{n_0+1} \\ h_{2,1}t^{n_0+1} & t^i + h_{2,2}t^{n_0+1} \end{pmatrix} \begin{pmatrix} ht^{-i} & 0 \\ 0 & t^i \end{pmatrix}^{-1} = \begin{pmatrix} f_{1,1}t^ih^{-1} & h_{1,2}t^{n_0+1-i} \\ h_{2,1}t^{n_0+1+i}h^{-1} & t^i + h_{2,2}t^{n_0+1-i} \end{pmatrix}. \end{align*} $$

Because h and $f_{1,1}t^i$ have the same image in $k'[t]/\left (t^{n_0+1}\right )$ and $n_0 \geq w_{1,2} =\operatorname {\mathrm {ord}}_t\left (f_{1,1}t^i\right )$ , we have that $\operatorname {\mathrm {ord}}_t(h) = w_{1,2}$ . Together with the fact that $n_0 \geq i$ , this implies that the entries of $g^{-1}$ are all elements of , so . We will now show that $g \cdot \widetilde {\psi } \in Z$ . We see that $g \cdot \widetilde {\psi }$ is equal to

$$ \begin{align*} \begin{pmatrix} ht^{-i} & 0 & h_{1,3} & h_{1,4} & \dotsb & h_{1,r} \\ 0 & t^i & h_{2,3} & h_{2,4} & \dotsb & h_{2,r} \end{pmatrix} \end{align*} $$

for some , and we have already shown that $\operatorname {\mathrm {ord}}_t\left (ht^{-i}\right ) = w_{1,2} - i$ . For any $j = 3, \dotsc , r$ , let (resp., ) be the $(1,j)$ th (resp., $(2,j)$ th) minor of $\psi $ . Then for any $j = 3, \dotsc , r$ , we have that $-f_{1,j}t^{i}$ and $q_{2,j}$ (resp., $f_{1,1}f_{2,j}$ and $q_{1,j}$ ) have the same image in $k'[t]/\left (t^{n_0+1}\right )$ , so because $n_0 \geq w_{2,j} = \operatorname {\mathrm {ord}}_t\left (-f_{1,j}t^i\right )$ (resp., $n_0 \geq w_{1,j} = \operatorname {\mathrm {ord}}_t(f_{1,1}f_{2,j})$ ), we have $\operatorname {\mathrm {ord}}_t\left (q_{2,j}\right ) = w_{2,j}$ (resp., $\operatorname {\mathrm {ord}}_t(q_{1,j}) = w_{1,j}$ ). Because , the matrices $\widetilde {\psi }$ and $g \cdot \widetilde {\psi }$ have the same minors, so

$$ \begin{align*} \operatorname{\mathrm{ord}}_t\left(h_{1,j}\right) &= \operatorname{\mathrm{ord}}_t\left(-q_{2,j}t^{-i}\right) = w_{2,j} - i, &\text{for all } j = 3, \dotsc, r,\\ \operatorname{\mathrm{ord}}_t\left(h_{2,j}\right) &= \operatorname{\mathrm{ord}}_t\left(q_{1,j}h^{-1}t^i\right) =w_{1,j} - w_{1,2} + i, &\text{for all } j = 3, \dotsc, r. \end{align*} $$

We have thus verified that $g \cdot \widetilde {\psi } \in Z$ , so $\psi \in \mathcal {C}$ , and thus we have finished showing

$$ \begin{align*} \mathcal{C}= \theta_{n_0}^{-1}\left( \mathscr{L}_{n_0}(\rho)\left(Z_{n_0}\right) \right). \end{align*} $$

Because $\mathscr {L}_{n_0}(\rho )\left (Z_{n_0}\right )$ is a constructible subset of $\mathscr {L}_n(\mathcal {X})$ by Chevalley’s theorem for Artin stacks [Reference Hall and RydhHR17, Theorem 5.2], this implies that $\mathcal {C}$ is a cylinder. We will use the remainder of this proof to compute $\mu _{\mathcal {X}}(\mathcal {C})$ .

Set $n_1 = \max (n_0, 2i-1)$ . For any $n \geq n_1$ , let $H_n$ be the closed subscheme of $\mathscr {L}_n\left (\mathbb {A}^{2 \times 2}_k\right )$ whose A-valued points, for any k-algebra A, are the $2 \times 2$ matrices of the form

$$ \begin{align*} \begin{pmatrix} 1+g_{1,1}t^{n+1-i} & g_{1,2}t^{n+1-i} \\ g_{2,1}t^{n+1-w_{1,2}+i} & 1-g_{1,1}t^{n+1-i} \\ \end{pmatrix} \end{align*} $$

for some $g_{1,2}, g_{2,1}, g_{2,2} \in A[t]/\left (t^{n+1}\right )$ . By our choice of $n_1$ ,

$$ \begin{align*} \det \begin{pmatrix} 1+g_{1,1}t^{n+1-i} & g_{1,2}t^{n+1-i} \\ g_{2,1}t^{n+1-w_{1,2}+i} & 1-g_{1,1}t^{n+1-i} \\ \end{pmatrix} = 1 \end{align*} $$

and

$$ \begin{align*} \begin{pmatrix} 1+g_{1,1}t^{n+1-i} & g_{1,2}t^{n+1-i} \\ g_{2,1}t^{n+1-w_{1,2}+i} & 1-g_{1,1}t^{n+1-i} \\ \end{pmatrix}& \begin{pmatrix} 1+g^{\prime}_{1,1}t^{n+1-i} & g^{\prime}_{1,2}t^{n+1-i} \\ g^{\prime}_{2,1}t^{n+1-w_{1,2}+i} & 1-g^{\prime}_{1,1}t^{n+1-i} \\ \end{pmatrix} \\ &= \begin{pmatrix} 1+\left(g_{1,1}+g^{\prime}_{1,1}\right)t^{n+1-i} & \left(g_{1,2}+g^{\prime}_{1,2}\right)t^{n+1-i} \\ \left(g_{2,1}+g^{\prime}_{2,1}\right)t^{n+1-w_{1,2}+i} & 1-\left(g_{1,1}+g^{\prime}_{1,1}\right)t^{n+1-i} \\ \end{pmatrix}, \end{align*} $$

so the inclusion $H_n \hookrightarrow \mathscr {L}_n\left (\mathbb {A}^{2 \times 2}_k\right )$ factors through a closed immersion $H_n \hookrightarrow \mathscr {L}_n(\mathrm {SL}_2)$ that gives $H_n$ the structure of a closed subgroup of $\mathscr {L}_n(\mathrm {SL}_2)$ , and $H_n \cong \mathbb {G}_a^{w_{1,2} + i}$ as algebraic groups.

For any $n \in \mathbb {N}$ , set $\widetilde {C}_n = \mathscr {L}_n(\rho )^{-1}\left (\theta _n(\mathcal {C})\right ) \subset \mathscr {L}_n\left (\widetilde {X}\right )$ . We will show that for $n \geq n_1$ ,

(5) $$ \begin{align} \mathrm{e}\left(\widetilde{C}_n\right) = \mathrm{e}(Z_n)\mathrm{e}(\mathscr{L}_n(\mathrm{SL}_2))\mathrm{e}(H_n)^{-1} = \mathrm{e}(Z_n)\mathrm{e}(\mathscr{L}_n(\mathrm{SL}_2))\mathbb{L}^{-w_{1,2}-i} \in K_0(\mathbf{Stack}_k). \end{align} $$

By equation (4) and Corollary 3.22, $\widetilde {C}_n$ is equal to the image of the morphism

$$ \begin{align*} \mathscr{L}_n(\mathrm{SL}_2) \times_k Z_n \to \mathscr{L}_n\left(\widetilde{X}\right) \end{align*} $$

induced by the action of $\mathscr {L}_n(\mathrm {SL}_2)$ on $\mathscr {L}_n\left (\widetilde {X}\right )$ . Thus to show equation (5), it is sufficient to show that for any field extension $k'$ of k and any $\widetilde {\psi }_n \in \widetilde {C}_n(k')$ , the fibre of $\mathscr {L}_n(\mathrm {SL}_2) \times _k Z_n \to \mathscr {L}_n\left (\widetilde {X}\right )$ over $\widetilde {\psi }_n$ is isomorphic to $H_n \otimes _k k'$ . Because $H_n$ is special and thus $H_n$ -torsors over $k'$ are trivial, it is sufficient to show that for any field extension $k'$ of k and $\widetilde {\psi }_n \in Z_n(k')$ ,

  • the stabiliser of $\widetilde {\psi }_n$ under the $\mathscr {L}_n(\mathrm {SL}_2)$ action is $H_n \otimes _k k'$ , and

  • if $g_n \in \mathscr {L}_n(\mathrm {SL}_2)(k')$ is such that $g_n \cdot \widetilde {\psi }_n \in Z_n(k')$ , then $g_n \cdot \widetilde {\psi }_n = \widetilde {\psi }_n$ .

To show both of these items, it is sufficient to show that for any $g_n \in \mathscr {L}_n(\mathrm {SL}_2)(k')$ ,

$$ \begin{align*} g_n \cdot \widetilde{\psi}_n \in Z_n(k') \implies g_n \in H_n(k') \implies g_n \cdot \widetilde{\psi}_n = \widetilde{\psi}_n, \end{align*} $$

where we note that because k has characteristic $0$ , we only need to show that $H_n \otimes _k k'$ and the stabiliser of $\widetilde {\psi }_n$ have the same underlying subset of $\mathscr {L}_n(\mathrm {SL}_2) \otimes _k k'$ . Write

$$ \begin{align*} \widetilde{\psi}_n = \begin{pmatrix} u_{1,1} t^{w_{1,2} - i} & 0 & \dotsb & u_{1,j} t^{w_{2,j} - i} & \dotsb \\ 0 & t^i & \dotsb & u_{2,j}t^{w_{1,j} - w_{1,2} + i} & \dotsb \end{pmatrix}, \end{align*} $$

and write

$$ \begin{align*} g_n = \begin{pmatrix} a & b \\ c & d \\ \end{pmatrix}, \end{align*} $$

with $a,b,c,d \in k'[t]/\left (t^{n+1}\right )$ . Then

(6) $$ \begin{align} g_n \cdot \widetilde{\psi}_n = \begin{pmatrix} au_{1,1} t^{w_{1,2} - i} & bt^i & \dotsb & au_{1,j}t^{w_{2,j}-i} + bu_{2,j}t^{w_{1,j}-w_{1,2}+i} & \dotsb \\ cu_{1,1}t^{w_{1,2}-i} & dt^i & \dotsb & cu_{1,j}t^{w_{2,j}-i} + du_{2,j}t^{w_{1,j}-w_{1,2}+i} & \dotsb \end{pmatrix}. \end{align} $$

We start with the first implication, so suppose $g_n \cdot \widetilde {\psi }_n \in Z_n(k')$ . Then $bt^i = cu_{1,1}t^{w_{1,2}-i} = 0$ and $dt^i = t^i$ , so $b = g_{1,2}t^{n+1-i}$ , $c = g_{2,1}t^{n+1 - w_{1,2}+i}$ , $d = 1 - g_{1,1}t^{n+1-i}$ for some units $g_{1,2}, g_{2,1}, g_{1,1}$ in $k'[t]/\left (t^{n+1}\right )$ . By our choice of $n_1$ ,

$$ \begin{align*} 1 = \det g_n = a\left(1 - g_{1,1}t^{n+1-i}\right) - g_{1,2}t^{n+1-i}g_{2,1}t^{n+1 - w_{1,2}+i} = a\left(1 - g_{1,1}t^{n+1-i}\right), \end{align*} $$

so

$$ \begin{align*} a = \left(1 - g_{1,1}t^{n+1-i}\right)^{-1} = 1 + g_{1,1}t^{n+1-i}, \end{align*} $$

and we have $g_n \in H_n(k')$ . The second implication is a straightforward application of equation (6) and condition (). We have therefore finished showing that $\mathrm {e}\left (\widetilde {C}_n\right ) = \mathrm {e}(Z_n)\mathrm {e}(\mathscr {L}_n(\mathrm {SL}_2))\mathbb {L}^{-w_{1,2}-i}$ .

Now we can complete the computation of $\mu _{\mathcal {X}}(\mathcal {C})$ . Set

$$ \begin{align*} s = w_{1,3} + \dotsb + w_{1,r} + w_{2,3} + \dotsb + w_{2,r}. \end{align*} $$

By Corollary 3.22 and the fact that $\mathscr {L}_n(\mathrm {SL}_2)$ is a special group, for any $n \geq n_1$ ,

$$ \begin{align*} \mathrm{e}(\theta_n(\mathcal{C})) = \mathrm{e}\left(\widetilde{C}_n\right) \mathrm{e}(\mathscr{L}_n(\mathrm{SL}_2))^{-1} = \mathrm{e}(Z_n)\mathbb{L}^{-w_{1,2}-i} = (\mathbb{L}-1)^{2r-3}\mathbb{L}^{n(2r-3) + (r-4)w_{1,2} - s}, \end{align*} $$

where the last equality is by the construction of $Z_n$ . Therefore, noting that $\dim \mathcal {X} = \dim \left (\mathbb {A}^{2 \times r}_k\right ) - \dim \mathrm {SL}_2 = 2r-3$ ,

$$ \begin{align*} \mu_{\mathcal{X}}(\mathcal{C}) = \lim_{n \to \infty} \mathrm{e}(\theta_n(\mathcal{C})) \mathbb{L}^{-(n+1)\dim\mathcal{X}} = (\mathbb{L}-1)^{2r-3} \mathbb{L}^{-(2r-3)+(r-4)w_{1,2}-s}.\\[-36pt] \end{align*} $$

We next compute the value of $\operatorname {\mathrm {sep}}_\pi $ on our sets of interest.

Proposition 10.11. Let $i, w_{1,2} \in \mathbb {N}$ and $\mathbf {w}_1, \mathbf {w}_2 \in \mathbb {N}^{r-2}$ satisfy (). Then the image of $\mathcal {C}^{\left (i, w_{1,2}, \mathbf {w}_1, \mathbf {w}_2\right )}$ under $\mathscr {L}(\pi )$ is equal to $C^{\left (w_{1,2}, \mathbf {w}_1, \mathbf {w}_2\right )}$ , and $\operatorname {\mathrm {sep}}_{\pi , \mathcal {C}^{\left (i, w_{1,2}, \mathbf {w}_1, \mathbf {w}_2\right )}}$ is equal to $1$ on all of $C^{\left (w_{1,2}, \mathbf {w}_1, \mathbf {w}_2\right )}$ .

Proof. The image of $\mathcal {C}^{\left (i, w_{1,2}, \mathbf {w}_1, \mathbf {w}_2\right )}$ is contained in $C^{\left (w_{1,2}, \mathbf {w}_1, \mathbf {w}_2\right )}$ by the construction of $Z^{\left (i, w_{1,2}, \mathbf {w}_1, \mathbf {w}_2\right )}$ . We now only need to show that $\operatorname {\mathrm {sep}}_{\pi , \mathcal {C}^{\left (i, w_{1,2}, \mathbf {w}_1, \mathbf {w}_2\right )}}$ is equal to $1$ on all of $C^{\left (w_{1,2}, \mathbf {w}_1, \mathbf {w}_2\right )}$ . Let $k'$ be a field extension of k and set $\varphi \in C^{\left (w_{1,2}, \mathbf {w}_1, \mathbf {w}_2\right )}(k')$ . Then for any $\{\ell , m\} \in {[r] \choose 2}$ , let be such that pulls back $x_{\ell ,m}\rvert _X$ to $h_{\ell ,m}$ . Then $\varphi $ is the image of the element $\widetilde {\psi }$ of $Z^{\left (i, w_{1,2}, \mathbf {w}_1, \mathbf {w}_2\right )}(k')$ given by the matrix

$$ \begin{align*} \begin{pmatrix} h_{1,2}t^{-i} & 0 & -h_{2,3}t^{-i} & -h_{2, 4}t^{-i} & \dotsb & -h_{2, r}t^{-i} \\ 0 & t^i & h_{1,3} h_{1,2}^{-1} t^i & h_{1,4} h_{1,2}^{-1} t^i & \dotsb & h_{1,r} h_{1,2}^{-1} t^i\end{pmatrix}, \end{align*} $$

so $\operatorname {\mathrm {sep}}_{\pi , \mathcal {C}^{\left (i, w_{1,2}, \mathbf {w}_1, \mathbf {w}_2\right )}} \geq 1$ on all of $C^{\left (w_{1,2}, \mathbf {w}_1, \mathbf {w}_2\right )}$ . Let $\psi \in \mathscr {L}(\mathcal {X})(k')$ be the image of $\widetilde {\psi }$ . To finish this proof, we only need to show that if $\psi ' \in \mathscr {L}(\mathcal {X})(k')$ has class in $\lvert \mathscr {L}(\mathcal {X})\rvert $ contained in $\mathcal {C}^{\left (i, w_{1,2}, \mathbf {w}_1, \mathbf {w}_2\right )}$ and satisfies $\mathscr {L}(\pi )(\psi ') = \varphi $ , then $\psi ' \cong \psi $ . Because $\mathrm {SL}_2$ is a special group and thus has only trivial torsors over , there exists $\widetilde {\psi }' \in \mathscr {L}\left (\widetilde {X}\right )(k')$ whose image is isomorphic to $\psi '$ . By construction, there exist some field extension $k''$ of $k'$ and such that $g \cdot \widetilde {\psi }^{\prime }_{k''} \in Z^{\left (i, w_{1,2}, \mathbf {w}_1, \mathbf {w}_2\right )}(k'')$ , where $\widetilde {\psi }^{\prime }_{k''}$ is the composition of with . By the construction of $Z^{\left (i, w_{1,2}, \mathbf {w}_1, \mathbf {w}_2\right )}$ , the entries of $g \cdot \widetilde {\psi }^{\prime }_{k''}$ are all determined by its minors and thus $g \cdot \widetilde {\psi }^{\prime }_{k''}$ is equal to the composition of with . Because $\widetilde {\psi }$ has nonzero $(1,2)$ -minor, this implies , so $g \cdot \widetilde {\psi '} = \widetilde {\psi }$ and $\psi ' \cong \psi $ , as desired.

Remark 10.1 and Proposition 10.11 tell us that if $r \geq 3$ , X has log-terminal singularities and $i, w_{1,2} \in \mathbb {N}$ and $\mathbf {w}_1, \mathbf {w}_2 \in \mathbb {N}^{r-2}$ satisfy (), then Conjecture 1.1 implies that $\mu _{\mathcal {X}}\left (\mathcal {C}^{\left (i, w_{1,2}, \mathbf {w}_1, \mathbf {w}_2\right )}\right ) = \mu ^{\mathrm {Gor}}_X\left (C^{\left (w_{1,2}, \mathbf {w}_1, \mathbf {w}_2\right )}\right )$ . For $r \in \{3,4\}$ , we verify this unconditionally by combining the foregoing results, thereby proving Proposition 10.7.

Proof of Proposition 10.7

Set $r \in \{3,4\}$ . It is clear that $\mathcal {S}$ is an infinite set. The third and fourth bullet points are justified by Remark 10.4 and Remark 10.8. Next, a straightforward computation using Remark 10.4, Proposition 10.9 and Proposition 10.10 shows

$$ \begin{align*} 0 \neq \mu_{\mathcal{X}}\left(\mathcal{C}^{\left(i, w_{1,2}, \mathbf{w}_1, \mathbf{w}_2\right)}\right) = \mu^{\mathrm{Gor}}_X\left(C^{\left(w_{1,2}, \mathbf{w}_1, \mathbf{w}_2\right)}\right). \end{align*} $$

By Remark 10.6 and Proposition 10.11, this implies

$$ \begin{align*} 0 \neq \mu_{\mathcal{X}}(\mathcal{C}) = \mu_{\mathcal{X}}\left(\mathcal{C} \cap \mathscr{L}(\pi)^{-1}(C)\right) = \int_C \operatorname{\mathrm{sep}}_{\pi, \mathcal{C}} \mathrm{d}\mu^{\mathrm{Gor}}_X \end{align*} $$

for all $(\mathcal {C},C)\in \mathcal {S}'$ .

Acknowledgments

We thank Dan Abramovich, Dan Edidin, Jack Hall, Martin Olsson and Karl Schwede for helpful conversations. We are also grateful to the anonymous referee for a thorough reading of our paper and many suggestions which improved the paper.

The first author’s research was partially supported by a Discovery Grant (RGPIN-2015-05631) from the National Science and Engineering Research Council of Canada.

Conflicts of Interest

None.

Footnotes

1 G is special if every G-torsor is Zariski locally trivial.

2 Note that we do not assume $\mathcal {X}$ is a fantastack here.

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