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Eisenstein congruences among Euler systems

Published online by Cambridge University Press:  06 November 2023

Ó. Rivero*
Affiliation:
Simons Laufer Mathematical Sciences Institute, 17 Gauss Way, Berkeley, CA 94720, United States
V. Rotger
Affiliation:
IMTech, UPC and Centre de Recerca Matemàtiques, C. Jordi Girona 1-3, 08034 Barcelona, Spain e-mail: [email protected]
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Abstract

We investigate Eisenstein congruences between the so-called Euler systems of Garrett–Rankin–Selberg type. This includes the cohomology classes of Beilinson–Kato, Beilinson–Flach, and diagonal cycles. The proofs crucially rely on different known versions of the Bloch–Kato conjecture, and are based on the study of the Perrin-Riou formalism and the comparison between the different p-adic L-functions.

Type
Article
Copyright
© The Author(s), 2023. Published by Cambridge University Press on behalf of The Canadian Mathematical Society

1 Introduction

The theory of Euler systems is a powerful machinery that provides deep insight on the arithmetic of Galois representations, Selmer groups, and Iwasawa main conjectures. There are relatively few instances of such Euler systems in the literature, and their construction is far from being a systematic issue. This work focuses on the interaction between different kinds of Euler systems, and can be seen as a natural continuation of our previous article [Reference Rivero and RotgerRiRo], where we had studied congruence relations between the system of circular units and Beilinson–Kato elements.

This note is concerned with the theory of Eisenstein congruences and the development of a p-adic Artin formalism at the level of Euler systems. The easiest instance of an Euler system is that of circular units, obtained as a weighted combination of cyclotomic units after applying the Kummer map. Its image under the Perrin-Riou regulator (a.k.a. Coleman map) allows us to recover the Kubota–Leopoldt p-adic L-function.

The three Euler systems we want to discuss here are slightly harder to describe. They are sometimes referred to as Euler systems of Garrett–Rankin–Selberg type, and the most well-known example comes from Kato’s work [Reference KatoKa], which allowed the proof of the Bloch–Kato conjecture for elliptic curves defined over $\mathbb Q$ in rank 0 and of one of the divisibilities of the Iwasawa main conjecture. The other two instances come from generalizations of that previous construction, when the two modular units involved in Kato’s construction are replaced by cuspidal forms. The case of Beilinson–Flach classes has been explored in different works of Bertolini, Darmon, and Rotger [Reference Bertolini, Darmon and RotgerBDR2], and Kings, Lei, Loeffler, and Zerbes [Reference Kings, Loeffler and ZerbesKLZ, Reference Kings, Loeffler and ZerbesKLZ2, Reference Lei, Loeffler and ZerbesLLZ]. The case of diagonal cycles, where a proper Euler system is not available (but a family of cohomology classes varying over Hida or Coleman families), has been worked out by Darmon and Rotger [Reference Darmon and RotgerDR2, Reference Darmon and RotgerDR4] and by Bertolini, Seveso, and Venerucci [Reference Bertolini, Seveso and VenerucciBSV1, Reference Bertolini, Seveso and VenerucciBSV2].

1.1 The setup

Let $N, k> 1$ be positive integers, $\chi _f: (\mathbb {Z}/N\mathbb {Z})^\times \rightarrow \bar {\mathbb {Q}}^\times $ a Dirichlet character, and $f \in S_k(N,\chi _f)$ a normalized cuspidal eigenform of level N, weight k, and nebentype $\chi _f$ . Fix a prime $p\nmid 6N \varphi (N)$ . Similarly, we fix eigenforms $g \in S_{\ell }(N, \chi _g)$ and $h \in S_m(N, \chi _h)$ , with $\ell ,m \geq 2$ and $\chi _g,\chi _h$ Dirichlet characters. Let F be the finite extension of $\mathbb {Q}$ generated by the field of coefficients of f, g, h and the values of all Dirichlet characters of conductor N; let $\mathcal O$ be its ring of integers and $\mathfrak p \subset {\mathcal O}$ a prime ideal above p. Before continuing, we need to introduce the following objects:

  1. $\mathscr H_{\mathbb Z_p}$ is the étale $\mathbb Z_p$ -sheaf on the open modular curve $Y_1(N)$ given by the Tate module of the universal elliptic curve $\mathcal E/Y_1(N)$ , as introduced in [Reference Kings, Loeffler and ZerbesKLZ, Definition 3.1.1] or [Reference Kings, Loeffler and ZerbesKLZ2, Section 2.3].

  2. $\operatorname {\mathrm {TSym}}^k \mathscr H_{\mathbb Z_p}$ is the sheaf of symmetric tensors of degree $k-2$ over $\mathscr H_{\mathbb Z_p}$ defined in [Reference Kings, Loeffler and ZerbesKLZ, Definition 3.1.2] or [Reference Kings, Loeffler and ZerbesKLZ2, Section 2.2]; after inverting $(k-2)!$ it is isomorphic to the $(k-2)$ th symmetric power of $\mathscr H_{\mathbb Z_p}$ .

  3. $T_{f,Y}$ is the integral p-adic Galois representations given as the f-isotypical quotient of $H^1_{\operatorname {\mathrm {et}}}(\bar {Y},\operatorname {\mathrm {TSym}}^{k-2}(\mathscr H_{\mathbb {Z}_p})(1)) \otimes _{\mathbb Z_p} \mathcal O_{\mathfrak p}$ of the closed modular curve of level $\Gamma _1(N)$ , as defined in [Reference Rivero and RotgerRiRo, equation (11)] in the case of trivial coefficients (see also (2)).

  4. $T_{f,X}$ is defined in the same way as $T_{f,Y}$ (see [Reference Rivero and RotgerRiRo, equation (11)]), but using compactly supported cohomology instead. We set, as usual, $V_{f,Y}=T_{f,Y}\otimes \mathbb {Q}$ and $V_{f,X}=T_{f,Y}\otimes \mathbb {Q}$ , and note that it holds $V_{f,Y}=V_{f,X}$ .

We also attach analogous lattices to g and h. All along the article, we impose that $k+\ell +m$ is even and that $\chi _f \chi _g \chi _h = 1$ . We assume that the triple $(k,\ell ,m)$ is balanced, that is, $\ell +m \geq k$ , $m+k \geq \ell $ , and $k+\ell \geq m$ . This means that we are in the so-called geometric region, where a construction of cohomology classes in an appropriate $H^1$ is meaningful and the corresponding L-value vanishes. For simplicity, we also assume $\chi _h \not \equiv 1\ \ \pmod {\mathfrak p}$ . For our further use, let $f^*=f\otimes \chi _f^{-1}$ be the twist of f by the inverse of its nebentype, and similarly for $g^*$ and $h^*$ .

Along this short note, we deal with three different objects, whose characterizations and main properties are recalled in Section 2. According to the discussions of [Reference Bertolini, Seveso and VenerucciBSV2, Remark 3.3], the global classes we introduce may have some bounded denominators, but along the introduction we assume that they are integral at p, which is always the case provided that p is large enough (in particular, we need that $p>\max \{k,\ell ,m\}$ to invert the factorials appearing in the formulas of loc. cit.); we come back to this issue later on in the text.

Set $c = (k+\ell +m-2)/2$ and consider:

  1. (a) The Beilinson–Kato class $\kappa _f \in H^1(\mathbb {Q}, T_{f,Y}(1)(\ell +m-c-1)$ , whose characterization is recalled in Section 2.3 following [Reference Bertolini, Darmon and VenerucciBD, Reference KatoKa].

  2. (b) The Beilinson–Flach class $\kappa _{f,g} \in H^1(\mathbb {Q}, T_{f,Y} \otimes T_{g,Y}(m-c))$ ; we recall its main properties in Section 2.4 following [Reference Bertolini, Darmon and RotgerBDR1, Reference Bertolini, Darmon and RotgerBDR2, Reference Kings, Loeffler and ZerbesKLZ].

  3. (c) The diagonal cycle class $\kappa _{f,g,h} \in H^1(\mathbb {Q}, T_{f,Y} \otimes T_{g,Y} \otimes T_{h,Y}(1-c))$ , introduced in Section 2.5 following [Reference Bertolini, Seveso and VenerucciBSV1, Reference Darmon and RotgerDR1, Reference Darmon and RotgerDR2].

Moreover, and as a piece of notation, we denote $\bar \kappa _f$ , $\bar \kappa _{f,g}$ , $\bar \kappa _{f,g,h}$ the reduction of the above integral classes modulo a suitable power of the prime ideal $\mathfrak p$ (usually denoted by $\mathfrak p^t$ ).

1.2 Main results

We use the notations about Eisenstein series introduced in [Reference Rivero and RotgerRiRo]; in particular, they are indexed by the weight and by a pair of Dirichlet characters whose products of nebentypes are N. When g is congruent modulo $\mathfrak p^t$ with the Eisenstein series $E_{\ell }(\chi _g,1)$ , as we discussed in loc. cit., there is a projection map

$$\begin{align*}T_{g,Y} \otimes \mathcal O/\mathfrak p^t \longrightarrow \mathcal O/\mathfrak p^t(\chi_g). \end{align*}$$

Hence, the class $\bar \kappa _{f,g}$ projects to an element

$$\begin{align*}\bar \kappa_{f,g,1} \in H^1(\mathbb{Q}, T_{f,Y} \otimes \mathcal O/\mathfrak p^t(\chi_g)(m-c)). \end{align*}$$

When this projection vanishes modulo $\mathfrak p^t$ , and proceeding as in [Reference Rivero and RotgerRiRo, Section 4], we may lift $\kappa _{f,g}$ to a class in $H^1(\mathbb Q, T_{f,Y} \otimes T_{g,X})$ and consider instead the projection

$$\begin{align*}T_{g,X} \otimes \mathcal O/\mathfrak p^t \longrightarrow \mathcal O/\mathfrak p^t(\ell-1). \end{align*}$$

Thus, we obtain a class

$$\begin{align*}\bar \kappa_{f,g,2} \in H^1(\mathbb{Q}, T_{f,Y}(\ell+m-c-1) \otimes \mathcal O/\mathfrak p^t). \end{align*}$$

To state our first theorem, let $L_p(f^*,\bar \chi _g,s)$ stand for the Mazur–Swinnerton-Dyer p-adic L-function attached to the pair $(f^*,\bar \chi _g)$ , with the conventions of [Reference Rivero and RotgerRiRo, Section 3]. The theorem depends on a weak Gorenstein assumption (properly introduced as Assumption 2.1) and on the conditions introduced as Assumptions 3.1 and 3.2. The latter makes reference to the conditions of big image and non-exceptional zeros which give a Bloch–Kato-type result, which allows us to conclude that the corresponding spaces on which the classes live are one-dimensional. We refer the reader to Section 3 for a precise discussion of these results and conditions, which are known in many different instances, so the assumptions are quite mild in nature.

Theorem 1.1 Suppose that Assumption 2.1 holds for g, that the Galois representation $T_{f,Y}$ is absolutely irreducible, and that Assumptions 3.1 and 3.2 also hold.

If $L_p(f^*, m-c+1), L_p(f^*,\bar \chi _g,m-c+1) \neq 0\ \ \pmod {\mathfrak p^t}$ , then $\bar \kappa _{f,g,1} = 0$ , and if we further have $L_p(f^*, \bar \chi _g, m-c+1), L_p(f^*,c-\ell -m+2) \neq 0\ \ \pmod {\mathfrak p^t}$ , the following congruence holds in $H^1(\mathbb Q, T_{f,Y}(\ell +m-c-1) \otimes \mathcal O/\mathfrak p^t)$ :

$$\begin{align*}\bar \kappa_{f,g,2} = \bar \kappa_f. \end{align*}$$

The proof is inspired by the ideas introduced in our previous work, using the Perrin-Riou formalism to perform a comparison at the level of p-adic L-functions. However, here, we have to proceed in a slightly different way: the first natural projection is 0 because of the local condition satisfied by the Beilinson–Flach class, and it is at second order where we can do a proper comparison.

We now mimic that approach in the framework of diagonal cycles, referring to Section 4 for a more precise discussion. When h is congruent modulo $\mathfrak p^t$ with $E_m(\chi _h,1)$ , we may define a class

$$\begin{align*}\bar \kappa_{f,g,h,1} \in H^1(\mathbb{Q}, T_{f,Y} \otimes T_{g,Y} \otimes \mathcal O/\mathfrak p^t(\chi_h)(1-c)). \end{align*}$$

When it vanishes, and proceeding as in the previous case, we have the refinement

$$\begin{align*}\bar \kappa_{f,g,h,2} \in H^1(\mathbb{Q}, T_{f,Y} \otimes T_{g,Y}(m-c) \otimes \mathcal O/\mathfrak p^t). \end{align*}$$

Let $L_p(f^*,g^*,\bar \chi _h,c)$ (resp. $L_p(g^*,f^*,\bar \chi _h,c)$ ) stand for the value at $s=c$ of the Rankin–Selberg p-adic L-function attached to $(f^*,g^*,\bar \chi _h)$ with f dominant (resp. g dominant), as recalled in Section 2.4.

Theorem 1.2 Suppose that Assumption 2.1 holds for h, that the Galois representations $T_{f,Y}$ and $T_{g,Y}$ are absolutely irreducible, and that Assumptions 4.1 and 4.2 hold.

If $L_p(f^*,g^*,\bar \chi _h,c) \neq 0\ \ \pmod {\mathfrak p^t}$ or $L_p(g^*,f^*,\bar \chi _h,c) \neq 0\ \ \pmod {\mathfrak p^t}$ , then $\bar \kappa _{f,g,h,1} = 0$ , and if we further have $L_p(f^*,g^*,c+1-m) \neq 0\ \ \pmod {\mathfrak p^t}$ or $L_p(g^*,f^*, c+1-m) \neq 0\ \ \pmod {\mathfrak p^t}$ , the following congruence holds in $H^1(\mathbb Q, T_{f,Y} \otimes T_{g,Y}(m-c) \otimes \mathcal O/\mathfrak p^t)$ :

$$\begin{align*}\bar \kappa_{f,g,h,2} = \bar{\kappa}_{f,g}. \end{align*}$$

We believe that most of the results we discuss are amenable to generalizations to Hida or Coleman families, but in that case one must be more circumspect about integrality issues. Deformations to weight one of the above congruence formulae may be particularly interesting, given their potential connection to the equivariant Birch and Swinnerton-Dyer conjecture. Furthermore, it would be interesting to explore whether our results could have applications to non-vanishing results, as in [Reference VatsalVa, Section 3], or to the study of classical problems like Goldfeld’s conjecture, as in [Reference Kriz and LiKrLi], where they establish congruences between elliptic units and Heegner points using a comparison between the p-adic L-functions of Katz and Bertolini–Darmon–Prasanna.

We finally point out that some of the results we state contain several assumptions which are likely to be relaxed, but we have not pursued this in an attempt to keep this work short and to avoid technical complications in that regard.

1.3 Relation to other works

This note grew up as an attempt to better understand the interactions among Euler systems coming from Eisenstein congruences with those discussed by Loeffler and the first author [Reference Loeffler and RiveroLR], where Coleman families passing through the critical p-stabilization of an Eisenstein series are studied. In that setting, we obtain analogous relations (in characteristic zero) between Beilinson–Flach and Beilinson–Kato classes, and between Beilinson–Kato and Beilinson–Flach. Compare [Reference Loeffler and RiveroLR, Theorems C1.13 and C2.11] in loc. cit. with the main result of this article. The reason behind this parallelism is that in both scenarios, we have two natural filtrations (one corresponding to the usual étale cohomology of the modular curve and the other to étale cohomology with compact support) whose interplay is used in an analogous way. To be more precise, in this article, we consider the lattices attached to the open and closed modular curve, that we denote by $T_{f,Y}$ and $T_{f,X}$ , respectively. In this case, there is an inclusion $T_{f,Y} \supset T_{f,X} \supset I \cdot T_{f,Y} \supset I \cdot T_{f,X} \supset \cdots $ , where I is the Eisenstein ideal. This is a parallel situation to what we had described in the discussion after [Reference Loeffler and RiveroLR, Corollary 6.1.3], where the maximal ideal $\mathfrak m$ considered in loc. cit. plays the role of the Eisenstein ideal. We hope that the interactions between these two settings can be pushed forward in subsequent works.

Another recent work dealing with the connections between different kinds of Euler systems is the article of Bertolini–Darmon–Venerucci [Reference Bertolini, Darmon and VenerucciBDV], where they prove a conjecture of Perrin-Riou relating Heegner points and Beilinson–Kato elements via the use of Beilinson–Flach elements. We believe that these kinds of techniques can have multiple applications to arithmetic problems and to the construction of new Euler systems, and we expect to come back to these issues in forthcoming work.

2 Background: Euler systems and reciprociy laws

2.1 Modular curves and lattices

We begin by recalling some notations about modular curves and lattices. For that purpose, fix algebraic closures $\bar {\mathbb {Q}}$ , $\bar {\mathbb {Q}}_p$ of $\mathbb {Q}$ and $\mathbb {Q}_p$ , respectively, and embeddings of $\bar {\mathbb {Q}}$ into $\bar {\mathbb {Q}}_p$ and $\mathbb {C}$ . The former singles out a prime ideal $\mathfrak p$ of ${\mathcal O}$ lying above p, and we let $\mathcal O_{\mathfrak p}$ denote the completion of $\mathcal O$ at $\mathfrak p$ . We also fix throughout an uniformizer $\varpi $ of $\mathcal O_{\mathfrak p}$ and an isomorphism $\mathbb C_p \simeq \mathbb C$ .

Given a variety $Y/\mathbb {Q}$ and a field extension $F/{\mathbb {Q}}$ , let $Y_F = Y \times F$ denote the base change of Y to F and set $\bar Y = Y_{\bar {\mathbb {Q}}}$ . Fix an integer $N\geq 3$ , and let $Y_1(N) \subset X_1(N)$ denote the canonical models over $\mathbb Q$ of the (affine and projective, respectively) modular curves classifying pairs $(A,i)$ where A is a (generalized) elliptic curve and $i: \mu _N \rightarrow A$ is an embedding of group schemes.

Let $k \geq 2$ be an integer, and let $\theta $ be a Dirichlet character. For a p-ordinary newform $f\in S_k(N,\theta )$ satisfying the congruence $f \equiv E_k(\theta ,1) \,\, \mathrm {mod} \, \mathfrak p^t$ , let $f(q)= \sum a_n(f) q^n$ denote its q-expansion at the cusp $\infty $ . Enlarge F so that it also contains the eigenvalues $\{ a_n(f)\}_{n\geq 1}$ , and still write ${\mathcal O}$ for its ring of integers and ${\mathcal O}_{{\mathfrak p}}$ for its completion at the prime ideal $\mathfrak {p}$ over p. For our further use, we denote by $\alpha _f\in {\mathcal O}_{\mathfrak p}^\times $ (resp. $\beta _f \in {\mathcal O}_{\mathfrak p}$ ) the unit root (resp. non-unit root) of the pth Hecke polynomial of f. Let $\psi _f: G_{\mathbb {Q}_p} \longrightarrow {\mathcal O}_{\mathfrak p}^\times $ denote the unramified character characterized by $\psi _f(\mathrm {Fr}_p)=\alpha _f$ .

Since f is ordinary at $\mathfrak {p}$ , it is well known (cf., e.g., [Reference Fukaya and KatoFK, Section 1.7]) that there are exact sequences of finitely generated ${\mathcal O}_{\mathfrak {p}}[G_{\mathbb Q_p}]$ -modules

(1) $$ \begin{align} 0 \rightarrow T_{f,X}^{\operatorname{\mathrm{sub}}} \rightarrow T_{f,X} \rightarrow T_{f,X}^{\operatorname{\mathrm{quo}}} \rightarrow 0, \\ \nonumber 0 \rightarrow T_{f,Y}^{\operatorname{\mathrm{sub}}} \rightarrow T_{f,Y} \rightarrow T_{f,Y}^{\operatorname{\mathrm{quo}}} \rightarrow 0 \end{align} $$

such that $T_{f,X}^{\operatorname {\mathrm {quo}}}$ and $T_{f,Y}^{\operatorname {\mathrm {quo}}}$ are unramified as $G_{\mathbb Q_p}$ -modules; and where the map $T_{f,X} \rightarrow T_{f,Y}$ induces an isomorphism $T_{f,X}^{\operatorname {\mathrm {sub}}}=T_{f,Y}^{\operatorname {\mathrm {sub}}}$ of free ${\mathcal O}_{{\mathfrak p}}$ -modules of rank $1$ on which $G_{\mathbb Q_p}$ acts through the cyclotomic character.

Let $I_f^* = (T^*_\ell -a_\ell (f)) \subset \mathbb {T}^*$ denote the ideal associated with the system of eigenvalues of f with respect to the dual Hecke operators. As in the introduction, consider the ${\mathcal O}_{{\mathfrak p}}$ -module

(2) $$ \begin{align} T_{f,Y} = H^1_{\operatorname{\mathrm{et}}}(\bar{Y},\operatorname{\mathrm{TSym}}^{k-2}(\mathscr H_{\mathbb{Z}_p})(1)) \otimes_{\mathbb Z_p} \mathcal O_{\mathfrak p}/ I^*_f, \end{align} $$

and define similarly $T_{f,X}$ , using compact support cohomology instead.

Note that the two lattices $T_{f,X}$ and $T_{f,Y}$ may give rise to different ${\mathcal O}_{{\mathfrak p}}[G_{\mathbb {Q}}]$ -modules in spite of the fact that the associated rational Galois representations

$$\begin{align*}V_f := T_{f,X} \otimes F_{{\mathfrak p}} \simeq T_{f,Y} \otimes F_{{\mathfrak p}} \end{align*}$$

are isomorphic.

Finally, let $\Sigma _X$ and $\Sigma _Y$ denote the torsion submodules of $T_{f,X}$ and $T_{f,Y}$ , respectively, and let

(3) $$ \begin{align} T_{f,Y,\circ}^{\operatorname{\mathrm{quo}}} := T_{f,Y}^{\operatorname{\mathrm{quo}}}/\Sigma_Y \simeq {\mathcal O}_{\mathfrak p}(\psi_f) \end{align} $$

denote the free quotient.

Since $f \equiv E_k(\theta ,1) \,\mbox {mod}\,\mathfrak p^t$ , we have

(4) $$ \begin{align} T_{f,Y,\circ}^{\operatorname{\mathrm{quo}}} \otimes \mathcal O/\mathfrak p^t \simeq \mathcal O/\mathfrak p^t(\theta), \end{align} $$

which amounts to the congruence $\psi _f \equiv \theta \, (\mbox {mod}\,\mathfrak p^t)$ as unramified characters of $G_{\mathbb {Q}_p}$ .

In the cases where we deal with several modular forms of common level N, we slightly abuse notations and still write F for the finite extension of $\mathbb Q$ generated by the field of coefficients of all of them and the values of all Dirichlet characters of conductor N. Similarly, $\mathcal O$ stands for the ring of integers and $\mathfrak p \subset \mathcal O$ for a prime ideal above p.

As in our previous work, we need the following assumption to establish our main results.

Assumption 2.1 The $G_{\mathbb Q_p}$ -module $\mathcal O/\mathfrak p^t(\theta )$ does not show up as a quotient of $\Sigma _Y/\Sigma _X$ .

In this case, we will say that $T_{f,Y}$ (or simply f, for short) satisfies the weak-Gorenstein condition. The reason is that this assumption automatically follows if the localization of the Hecke algebra acting on $M_k(\Gamma _1(N))$ at the Eisenstein ideal is Gorenstein.

Several of our results are suitably formulated in the language of families. Let $\mathcal W$ denote the weight space defined as the formal spectrum of the Iwasawa algebra $\Lambda =\mathcal O_{\mathfrak p}[[\mathbb Z_p^{\times }]]$ . The set of classical points in $\mathcal W$ is given by characters $\nu _{s,\xi }$ of the form $\xi \varepsilon _{\operatorname {\mathrm {cyc}}}^{s-1}$ where $\xi $ is a Dirichlet character of p-power conductor, $\varepsilon _{\operatorname {\mathrm {cyc}}}$ is the cyclotomic character, and s is an integer; this forms a dense subset in $\mathcal W$ for the Zariski topology. Let $\mathcal W^{\circ }$ further denote the set of those points with $\xi =1$ ; we shall often write s in place of $\nu _s = \nu _{s,1}$ . Let $\mathcal W^{\pm } \subset \mathcal W$ denote the topological closure of the set of points $\xi \varepsilon _{\operatorname {\mathrm {cyc}}}^{s-1}$ with $(-1)^{s-1} \xi (-1) = \pm 1$ . We have $\mathcal W= \mathcal W^+ \sqcup \mathcal W^-$ , and we write $\Lambda = \Lambda ^+ \oplus \Lambda ^-$ for the corresponding decomposition of the Iwasawa algebra.

2.2 Congruences between canonical periods

Recall that the de Rham Dieudonné module $D_{\operatorname {{\mathrm {dR}}}}(V_f)$ associated with the eigenform f is an $F_{\mathfrak p}$ -filtered vector space of dimension $2$ . Poincaré duality yields a perfect pairing

$$\begin{align*}\langle \, , \, \rangle: D_{\operatorname{{\mathrm{dR}}}}(V_f(-1)) \times D_{\operatorname{{\mathrm{dR}}}}(V_{f^*}) \rightarrow F_{\mathfrak p}, \end{align*}$$

and there is an exact sequence of Dieudonné modules

(5) $$ \begin{align} 0 \rightarrow D_{\operatorname{{\mathrm{dR}}}}(V_f^{\operatorname{\mathrm{sub}}}) \rightarrow D_{\operatorname{{\mathrm{dR}}}}(V_f) \rightarrow D_{\operatorname{{\mathrm{dR}}}}(V_f^{\operatorname{\mathrm{quo}}}) \rightarrow 0, \end{align} $$

where $D_{\operatorname {{\mathrm {dR}}}}(V_f^{\operatorname {\mathrm {sub}}})$ and $D_{\operatorname {{\mathrm {dR}}}}(V_f^{\operatorname {\mathrm {quo}}})$ have both dimension $1$ .

Falting’s theorem associates with f a regular differential form $\omega _f \in \mathrm {Fil}(D_{\operatorname {{\mathrm {dR}}}}(V_f))$ , which gives rise to an element in $D_{\operatorname {{\mathrm {dR}}}}(V_f^{\operatorname {\mathrm {quo}}})$ via the right-most map in (5) and in turn induces a linear form

(6) $$ \begin{align} \omega_f \, : \, D_{\operatorname{{\mathrm{dR}}}}(V_{f^*}^{\operatorname{\mathrm{sub}}}(-1)) \rightarrow F_{\mathfrak p}, \quad \eta \mapsto \langle \omega_f, \eta \rangle \end{align} $$

that we continue to denote with same symbol by a slight abuse of notation.

There is also a differential $\eta _f$ , which is characterized by the property that it spans the line $D_{\operatorname {{\mathrm {dR}}}}(V_f^{\operatorname {\mathrm {sub}}}(-1))$ and is normalized so that

(7) $$ \begin{align} \langle \eta_f, \omega_{f^*} \rangle = 1. \end{align} $$

Again, it induces a linear form

(8) $$ \begin{align} \eta_f \, : \, D_{\operatorname{{\mathrm{dR}}}}(V_{f^*}^{\operatorname{\mathrm{quo}}}) \rightarrow F_{\mathfrak p}, \quad \omega \mapsto \langle \eta_f, \omega \rangle. \end{align} $$

Now, let T be an unramified ${\mathcal O}_{\mathfrak p}[\mathrm {Gal\,}(\bar {\mathbb {Q}}_p/\mathbb {Q}_p)]$ -module and set $V=T\otimes F_{\mathfrak p}$ . Let $\hat {\mathbb {Z}}_p^{\mathrm {ur}}$ denote the completion of the ring of integers of the maximal unramified extension of $\mathbb {Q}_p$ , and define the integral Dieudonné module

$$ \begin{align*}D(T) := (T \, \hat{\otimes}_{\mathbb{Z}_p} \, \hat{\mathbb{Z}}_p^{\mathrm{ur}})^{\mathrm{Fr}_p=1}. \end{align*} $$

As shown in [Reference OhtaOh1, Theorem 2.1.11], we have $D_{\operatorname {{\mathrm {dR}}}}(V) = D(T)\otimes F_{\mathfrak p}$ .

As explained, e.g., in [Reference Fukaya and KatoFK, Proposition 1.7.6], there is a functorial isomorphism of ${\mathcal O}_{\mathfrak p}$ -modules (forgetting the Galois structure) given by

(9) $$ \begin{align} T \, \stackrel{\sim}{\longrightarrow } D(T). \end{align} $$

This map is not canonical as it depends on a choice of root of unity; for $T={\mathcal O}_{\mathfrak p}(\chi )$ , we take it to be given by the rule $1 \mapsto \, \mathfrak g(\chi )$ .

Recall the free ${\mathcal O}_{\mathfrak {p}}$ -quotient

$$ \begin{align*}T_{f,Y,\circ}^{\operatorname{\mathrm{quo}}} \simeq {\mathcal O}_{\mathfrak p}(\psi_f); \end{align*} $$

note in particular that $T_{f,Y,\circ }^{\operatorname {\mathrm {quo}}}$ is unramified.

Recall the uniformizer $\varpi $ fixed at the outset in Section 2.1. Let $C_{f^*} =(\varpi ^r)\subseteq O_{\mathfrak p}$ denote the congruence ideal attached with $f^*$ as defined, e.g., in [Reference OhtaOh2]. In Hida’s terminology, $\varpi ^r$ is sometimes called a congruence divisor. According to [Reference Kings, Loeffler and ZerbesKLZ2, Section 10.1.2], the image of $\eta _{f^*|D(T_{f,Y}^{\operatorname {\mathrm {quo}}})}$ is precisely the inverse $C_{f^*}^{-1}$ of the congruence ideal, and hence there is an isomorphism

$$\begin{align*}\eta_{f^*} \, : \, D(T_{f,Y,\circ}^{\operatorname{\mathrm{quo}}}) \longrightarrow C_{f^*}^{-1}, \quad \omega \mapsto \langle \eta_{f^*},\omega \rangle. \end{align*}$$

Setting $\tilde {\eta} _{f^*} := \varpi ^r \cdot {\eta} _{f^*}$ , the above map gives rise to an isomorphism of $O_{\mathfrak p}$ -modules

(10) $$ \begin{align} \tilde {\eta}_{f^*} \, : \, D(T_{f,Y,\circ}^{\operatorname{\mathrm{quo}}}) \longrightarrow \mathcal O_{\mathfrak p}, \quad \omega \mapsto \langle \tilde {\eta}_{f^*},\omega \rangle. \end{align} $$

Choose an isomorphism of $G_{\mathbb Q_p}$ -modules.

(11) $$ \begin{align} \bar\iota_1: \bar{T}_{f,Y,\circ}^{\operatorname{\mathrm{quo}}} \stackrel{\sim}{\longrightarrow} {\mathcal O}/\mathfrak{p}^t(\theta). \end{align} $$

Fixing such a map amounts to choosing the class $(\mathrm {mod}\,{\mathfrak p^t})$ of an isomorphism of local modules $\iota _1: T_{f,Y,\circ }^{\operatorname {\mathrm {quo}}} \simeq \mathcal O_{\mathfrak p}(\psi _f)$ . In light of the functoriality provided by (9), this determines and is determined by the class $(\mathrm {mod}\,{\mathfrak p^t})$ of an isomorphism $D(\iota _1): D(T_{f,Y,\circ }^{\operatorname {\mathrm {quo}}}) \simeq D({\mathcal O}_{\mathfrak p}(\psi _f))$ .

We choose $\iota _1$ as the single isomorphism making the following diagram commutative:

(12)

Indeed, since both $ \langle \, , \tilde {\eta} _{f^*}\rangle $ and $\cdot 1/ \mathfrak g(\theta )$ are isomorphisms, it follows that such a map $D(\iota _1)$ exists and is unique, and this in turn pins down $\iota _1$ and $\bar \iota _1$ in light of (9).

There are similar results for the differential $\omega _f$ . Using again [Reference Kings, Loeffler and ZerbesKLZ2, Section 10.1.2], there is an isomorphism

$$\begin{align*}\omega_{f^*} \, : \, D(T_{f,Y}^{\operatorname{\mathrm{sub}}}) \longrightarrow \mathcal O_{\mathfrak p}, \quad {\eta} \mapsto \langle \omega_{f^*}, {\eta} \rangle. \end{align*}$$

Hence, we may choose an isomorphism of $G_{\mathbb Q_p}$ -modules

(13) $$ \begin{align} \bar\iota_2: \bar{T}_{f,Y}^{\operatorname{\mathrm{sub}}} \stackrel{\sim}{\longrightarrow} {\mathcal O}/\mathfrak{p}^t(1). \end{align} $$

Fixing such a map amounts to choosing the class $(\mathrm {mod}\,{\mathfrak p^t})$ of an isomorphism of local modules $\iota _2: T_{f,Y}^{\operatorname {\mathrm {sub}}} \simeq \mathcal O_{\mathfrak p}(k-1)$ . This determines and is determined by the class $(\mathrm {mod}\,{\mathfrak p^t})$ of an isomorphism $D(\iota _2): D(T_{f,Y}^{\operatorname {\mathrm {sub}}}) \simeq D({\mathcal O}_{\mathfrak p})$ .

We choose $\iota _2$ as the single isomorphism making the following diagram commutative:

(14)

Indeed, since both $ \langle \, , \omega _{f^*}\rangle $ and $\cdot 1$ are isomorphisms, it follows that such a map $D(\iota _2)$ exists and is unique, and this in turn pins down $\iota _2$ and $\bar \iota _2$ .

2.3 The Beilinson–Kato Euler system

In this section, we recall the reciprocity law for Beilinson–Kato elements of arbitrary weight. For details on the constructions, see, e.g., [Reference KatoKa] or [Reference Bertolini and DarmonBD]. As in the introduction, let $f \in S_k(N,\chi _f)$ , let $\psi $ stand for a Dirichlet character, and consider two auxiliary positive integers $(\ell ,m)$ , with $\ell ,m \geq 2$ and the triple $(k,\ell ,m)$ balanced. The Beilinson–Kato class is an element

(15) $$ \begin{align} \kappa_f \in H^1(\mathbb Q, T_{f,Y}(\psi)(1)) \end{align} $$

obtained as the cup product of two Eisenstein classes $\delta _g$ and $\delta _h$ of weights $\ell -2$ and $m-2$ , respectively. The class is then obtained by applying the Hochschild–Serre map and projecting to the f-isotypical component. In particular,

$$\begin{align*}\delta_g \in H_{\operatorname{\mathrm{et}}}^1(\bar Y, \operatorname{\mathrm{TSym}}^{\ell-2}(\mathscr H_{\mathbb Z_p})(\psi)(1)) \quad \text{and} \quad \delta_h \in H_{\operatorname{\mathrm{et}}}^1(\bar Y, \operatorname{\mathrm{TSym}}^{m-2}(\mathscr H_{\mathbb Z_p})(1)). \end{align*}$$

As a piece of notation, we write $c = (k+\ell +m-2)/2$ and $q = (\ell +m-k)/2> 0$ . The classes also depend on an auxiliary pair of Dirichlet character $(\chi _1,\chi _2)$ , and $\chi _1/\chi _2$ is assumed to be nontrivial modulo p and of nebentype relatively prime to p. If the choices of $\ell $ , m, and $\chi $ are clear from the setting, we drop them from the notation.

Further, we emphasize that in Kato’s construction, in order to get integral classes, one has to choose a pair of integers $c,d$ and the class actually depends on this choice; here, we content ourselves with having p-integral classes. Under the running assumptions, the class of equation (15) is integral at p provided that $p \nmid N$ and that $\chi $ is nontrivial modulo p, as it follows from the discussions of, e.g., [Reference KingsKings, Section 5.4] and [Reference Kings, Loeffler and ZerbesKLZ, Sections 4, 7, and 9].

It may be instructive to keep in mind the parallelism with the weight two scenario considered in [Reference Rivero and RotgerRiRo, Section 2]. In that case, where $k=\ell =m=2$ , the Beilinson–Kato class is obtained as the cup product of the modular units

$$\begin{align*}u_{\chi_1,\chi_2} \cup u_{1,\xi} \in H_{\operatorname{\mathrm{et}}}^2(\bar Y,\mathbb Z_p(\chi)(2)), \end{align*}$$

where $u_{\chi _1,\chi _2} \in H^1(\mathbb Q, \mathbb Z_p(\chi _1)(1))$ and $u_{1,\xi } \in H^1(\mathbb Q, \mathbb Z_p(1))$ . Applying now the Hochschild–Serre map and projecting to the f-isotypical component, we get the desired class.

As a piece of notation, let

$$ \begin{align*}\underline{\varepsilon}_{\operatorname{\mathrm{cyc}}}: G_{\mathbb Q} \rightarrow \Lambda^{\times} \end{align*} $$

denote the $\Lambda $ -adic cyclotomic character which sends a Galois element $\sigma $ to the group-like element $[\varepsilon _{\operatorname {\mathrm {cyc}}}(\sigma )]$ . It interpolates the powers of the $\mathbb Z_p$ -cyclotomic character, in the sense that for any arithmetic point of the form $\nu _{s,\xi }\in \mathcal W$ ,

(16) $$ \begin{align} \nu_{s,\xi} \circ \underline{\varepsilon}_{\operatorname{\mathrm{cyc}}} = \xi \cdot \varepsilon_{\operatorname{\mathrm{cyc}}}^{s-1}. \end{align} $$

Finally, let t stand for Fontaine’s p-adic analogue of $2\pi i$ .

Proposition 2.2 Assume that $\alpha _f \psi (p) \not \equiv 1\ \ \pmod {\mathfrak p}$ . Then there exists a homomorphism of $\Lambda $ -modules

$$\begin{align*}\mathcal L_{f}^-: H^1(\mathbb Q_p, T_{f,Y,\circ}^{\operatorname{\mathrm{quo}}} \otimes \Lambda(\psi)(\varepsilon_{\operatorname{\mathrm{cyc}}}^q \underline{\varepsilon}_{\operatorname{\mathrm{cyc}}})) \longrightarrow \Lambda \end{align*}$$

satisfying the following interpolation property: for $s \in \mathcal W^{\circ }$ , the specialization of $\mathcal L_{f}^-$ at s is the homomorphism

$$\begin{align*}\mathcal L_{f,s}^-: H^1(\mathbb Q_p, T_{f,Y,\circ}^{\operatorname{\mathrm{quo}}}(\psi)(s+q-1)) \longrightarrow \mathcal O_{\mathfrak p} \end{align*}$$

given by

$$\begin{align*}\mathcal L_{f,s}^- = \frac{1- \bar \psi(p) \alpha_{f}^{-1} p^{-s}}{1-\psi(p)\alpha_f p^{s-1}} \times \begin{cases} \frac{(-1)^s}{(s-1)!} \times \langle \log_{\operatorname{\mathrm{BK}}}, t^s \tilde {\eta}_{f^*} \rangle, & \text{ if } s \geq 2-q, \\ (-s)! \times \langle \exp_{\operatorname{\mathrm{BK}}}^*, t^s \tilde {\eta}_{f^*} \rangle, & \text{ if } s < 2-q, \end{cases} \end{align*}$$

where $\log _{\operatorname {\mathrm {BK}}}$ is the Bloch–Kato logarithm and $\exp _{\operatorname {\mathrm {BK}}}^*$ is the dual exponential map.

Proof This follows from Coleman and Perrin-Riou’s theory of $\Lambda $ -adic logarithm maps as extended by Loeffler and Zerbes in [Reference Loeffler and ZerbesLZ]. In particular, [Reference Kings, Loeffler and ZerbesKLZ2, Theorem 8.2.3] yields an injective map

$$ \begin{align*}H^1(\mathbb Q_p, T_{f,Y,\circ}^{\operatorname{\mathrm{quo}}} \otimes \Lambda(\psi)(\varepsilon_{\operatorname{\mathrm{cyc}}}^q \underline{\varepsilon}_{\operatorname{\mathrm{cyc}}})) \longrightarrow D(T_{f,Y,\circ}^{\operatorname{\mathrm{quo}}}) \otimes \Lambda, \end{align*} $$

since $H^0(\mathbb Q_p,T_{f,\circ }^{\operatorname {\mathrm {quo}}}(\psi )) = 0$ because of the assumption that $\alpha _f \psi (p) \not \equiv 1$ modulo $\mathfrak p$ . This map is characterized by the interpolation property formulated in [Reference Loeffler and ZerbesLZ, Appendix B]. Next, we apply the pairing of (10) and the result follows.

In particular, for $q=0$ , we recover the homomorphism introduced in [Reference Rivero and RotgerRiRo, Section 3.4]. The assumption $\alpha _f \psi (p) \not \equiv 1$ modulo $\mathfrak p$ is necessary to have image in $\Lambda $ , but it may be still possible that for a fixed value of s the image is integral even though the condition is not satisfied (see [Reference Kings, Loeffler and ZerbesKLZ2, Section 8.2] for a precise description of the kernel and cokernel of that map).

The following result, essentially due to Kato (and reformulated in our language by Bertolini and Darmon), shows that there exists a $\Lambda $ -adic cohomology class whose bottom layer is precisely $\kappa _f$ and whose image under a suitable regulator map recovers the p-adic L-function attached to $f^*$ . To fix notations, let $L_p(f^*,\psi ,s)$ stand for the Mazur–Swinnerton-Dyer p-adic L-function attached to a modular form $f^*$ and a Dirichlet character $\psi $ , with the conventions used in Section 3 of loc. cit. Let $L_p(f^*,E_k(\chi _1,\chi _2),s)$ be the Hida–Rankin p-adic L-function attached to the two modular forms $f^*$ and $E_k(\chi _1,\chi _2)$ . The result admits different variations according to our precise choice of twists, but all of them follow from this one in an easy way.

Proposition 2.3 Under the assumptions of Proposition 2.2, there exists a $\Lambda $ -adic cohomology class

$$\begin{align*}\kappa_{f,\infty} \in H^1(\mathbb Q, T_{f,Y} \otimes \Lambda^-(\varepsilon_{\operatorname{\mathrm{cyc}}}^q \underline{\varepsilon}_{\operatorname{\mathrm{cyc}}})) \end{align*}$$

such that:

  1. (a) There is an explicit reciprocity law

    $$\begin{align*}\mathcal L_{f}^-(\mathrm{res}_p(\kappa_{f,\infty})^-) = L_p(f^*, E_{\ell}(1,\chi),q+s), \end{align*}$$
    and there is a factorization
    $$\begin{align*}L_p(f^*, E_{\ell}(1,\chi),q+s) = \frac{-L_p(f^*,\chi,\frac{k+\ell-m}{2})}{\mathfrak g(\bar \chi)} \times L_p(f^*,q+s). \end{align*}$$
    Here, $\mathrm {res}_p$ stands for the map corresponding to localization at p and $\mathrm {res}_p(\kappa _{f,\infty })^-$ is the image under the map induced in cohomology from the projection map $T_{f,Y} \rightarrow T_{f,Y,\circ }^{\operatorname {\mathrm {quo}}}$ .
  2. (b) The bottom layer $\kappa _{f}(q)$ lies in $H_{\operatorname {\mathrm {f}}}^1(\mathbb Q, T_{f}(q))$ and satisfies

    $$\begin{align*}\kappa_{f}(q) = \mathcal E_f \cdot \kappa_f, \end{align*}$$
    where $\mathcal E_f$ is the Euler factor
    $$\begin{align*}\mathcal E_f = (1- \bar \chi(p) \beta_{f} p^{m-c-1})(1-\bar \chi_f \chi(p) \beta_{f} p^{\ell-c-1})(1- \alpha_{f}p^{-1})(1-\beta_{f}p^{-1}). \end{align*}$$

Proof This is due to Kato [Reference KatoKa]; see also the work of Bertolini and Darmon [Reference Bertolini and DarmonBD, Theorems 4.4 and 5.1].

Note that [Reference Bertolini and DarmonBD] does not keep track of integrality issues, but the running assumptions are enough to have integral classes at p; in particular, the factors depending on c and d are invertible modulo p because of the nontriviality of the auxiliary character $\chi _1/\chi _2$ and may be absorbed inside the cohomology classes (see, e.g., [Reference Kings, Loeffler and ZerbesKLZ2, Section 9.4] for a discussion on the shape of the factors, where the role of $\chi $ is played by the product of $\chi $ and $\nu $ in their notations).

2.4 The Beilinson–Flach Euler system

We now introduce the Beilinson–Flach classes and a reciprocity law for them. See [Reference Kings, Loeffler and ZerbesKLZ, Reference Kings, Loeffler and ZerbesKLZ2] for details on the construction. Let $f \in S_k(N,\chi _f)$ and $g \in S_{\ell }(N,\chi _g)$ be two cuspidal eigenforms with $\chi _f \chi _g \not \equiv 1\ \ \pmod {\mathfrak p}$ , and let s be an integer such that $1 \leq s < \min (k,\ell )$ . The Beilinson–Flach element constructed in [Reference Kings, Loeffler and ZerbesKLZ] is a class

(17) $$ \begin{align} \kappa_{f,g} \in H^1(\mathbb Q, T_{f,Y} \otimes T_{g,Y}(1-s)), \end{align} $$

obtained via the pushforward of a class

$$\begin{align*}\delta_h \in H_{\operatorname{\mathrm{et}}}^1(\bar Y, \operatorname{\mathrm{TSym}}^{m-2}(\mathscr H_{\mathbb Z_p})(1)) \end{align*}$$

along the diagonal $Y \hookrightarrow Y^2$ ; then one applies the Hochschild–Serre map and projects to the $(f,g)$ -isotypic component. Here, we can see the cyclotomic twist s as a shortcut for $c-m+1$ . Observe once more that these classes have no denominators at p; see [Reference Kings, Loeffler and ZerbesKLZ, Remark 7.1.2] and [Reference Kings, Loeffler and ZerbesKLZ2, Section 3.2].

In the case where $k=\ell =2$ and $s=1$ , the construction can be summarized as follows: take the Eisenstein element $u_{1, \chi _f \chi _g} \in H_{\operatorname {\mathrm {et}}}^1(Y, \mathbb Z_p(1))$ and consider the Gysin map (push-forward of appropriate sheaves) along the diagonal $Y \hookrightarrow Y \times Y$ to get a class in $H_{\operatorname {\mathrm {et}}}^3(Y^2,\mathbb Z_p(2))$ . Applying the Hochschild–Serre map and projecting to the $(f,g)$ -istypical component, we get the desired class. See, e.g., [Reference Kings, Loeffler and ZerbesKLZ, Section 4]. (It must be pointed out that we are allowed to use the Hochschild–Serre identification since the $H^3$ of a surface over $\bar {\mathbb Q}$ vanishes.)

Remark 2.4 The classes we are working with are the so-called Eisenstein classes in the terminology of [Reference Kings, Loeffler and ZerbesKLZ2, Section 8]. Observe that the Euler factors that appear at Proposition 8.1.3 of loc. cit. are precisely the same as those of the previous section, except for the c-factor that arises in the reciprocity law for Beilinson–Flach elements when we vary f and g in families and which plays no role when $\chi _f \chi _g \neq 1$ . If we had opted to work with integral classes, and not just p-integral classes, we should have kept track of this choice of c and do that in a compatible way in the case of Beilinson–Kato elements.

Proposition 2.5 Assume that $\alpha _f \alpha _g^{-1} \chi _g(p) \not \equiv 1\ \ \pmod {\mathfrak p}$ . Then there exists a homomorphism of $\Lambda $ -modules

$$\begin{align*}\mathcal L_{f,g}^{-+}: H^1(\mathbb Q_p, T_{f,Y,\circ}^{\operatorname{\mathrm{quo}}} \otimes T_{g,Y}^{\operatorname{\mathrm{sub}}} \otimes \Lambda(\varepsilon_{\operatorname{\mathrm{cyc}}}\underline{\varepsilon}_{\operatorname{\mathrm{cyc}}})) \longrightarrow \Lambda \end{align*}$$

satisfying the following interpolation property: for $r \in \mathcal W^{\circ }$ , the specialization of $\mathcal L_{f,g}^-$ at s is the homomorphism

$$\begin{align*}\mathcal L_{f,g,s}^{-+}: H^1(\mathbb Q_p, T_{f,Y,\circ}^{\operatorname{\mathrm{quo}}} \otimes T_{g,Y}^{\operatorname{\mathrm{sub}}} (s)) \longrightarrow \mathcal O_{\mathfrak p} \end{align*}$$

given by

$$\begin{align*}\mathcal L_{f,g,s}^{-+} = \frac{1-\alpha_f^{-1} \beta_g^{-1} p^{-s}}{1-\alpha_f \beta_g p^{s-1}} \times \begin{cases} \frac{(-1)^{s+1}}{s!} \times \langle \log_{\operatorname{\mathrm{BK}}}, t^{s+1} \tilde {\eta}_{f^*} \otimes \omega_{g^*} \rangle, & \text{ if } s \geq 0, \\ (-s-1)! \times \langle \exp_{\operatorname{\mathrm{BK}}}^*, t^{s+1} \tilde {\eta}_{f^*} \otimes \omega_{g^*} \rangle, & \text{ if } s < 0. \end{cases} \end{align*}$$

Proof As in Proposition 2.2, this follows from the general theory of Perrin-Riou maps (see [Reference Kings, Loeffler and ZerbesKLZ2, Theorem 8.2.8] for this formulation).

For the following result, let $L_p(f^*, g^*,s)$ stand for the Hida–Rankin p-adic L-function attached to the convolution of two modular forms. Note that this function is not symmetric on the two modular forms. Let $\chi = \bar \chi _f \bar \chi _g$ . The following result, established by Kings, Loeffler, and Zerbes, shows that there exists a $\Lambda $ -adic class whose bottom layer is $\kappa _{f,g}$ (up to a suitable Euler factor) and which recovers the Hida–Rankin p-adic L-functions.

Proposition 2.6 Under the assumptions of Proposition 2.5, there exists a $\Lambda $ -adic cohomology class

$$\begin{align*}\kappa_{f,g,\infty} \in H^1(\mathbb Q, T_{f,Y} \otimes T_{g,Y} \otimes \Lambda(\varepsilon_{\operatorname{\mathrm{cyc}}} \underline{\varepsilon}_{\operatorname{\mathrm{cyc}}})) \end{align*}$$

such that:

  1. (a) There is an explicit reciprocity law

    $$\begin{align*}\mathcal L_{f}^-(\mathrm{res}_p(\kappa_{f,g,\infty})^{-+}) = L_p(f^*, g^*,1+s), \end{align*}$$
    where $\mathrm {res}_p$ stands for the map corresponding to localization at p and $\mathrm {res}_p(\kappa _{f,g,\infty })^{-+}$ is the image under the map induced in cohomology from the projection map $T_{f,Y} \otimes T_{g,Y} \rightarrow T_{f,Y,\circ }^{\operatorname {\mathrm {quo}}} \otimes T_{g,Y}^{\operatorname {\mathrm {sub}}}$ .
  2. (b) For $1 \leq s < \min \{k,\ell \}$ , the bottom layer $\kappa _{f,g}(s) \in H^1(\mathbb Q, T_{f,Y} \otimes T_{g,Y}(s))$ satisfies

    $$\begin{align*}\kappa_{f,g}(s) = \mathcal E_{f,g} \cdot \kappa_{f,g}, \end{align*}$$
    where $\mathcal E_{f,g}$ is the Euler factor
    $$\begin{align*}\mathcal E_{f,g} = (1-\beta_f \alpha_g p^{-s}) (1-\beta_f \beta_g \chi(p) p^{s+1-k-\ell})(1-\beta_g \alpha_f p^{-s}) (1-\beta_g \beta_f p^{-s}). \end{align*}$$

Proof This follows from considering the result of [Reference Kings, Loeffler and ZerbesKLZ2, Theorem 10.2.2] when the two modular forms are fixed.

Note that the condition $\chi _f\chi _g \not \equiv 1\ \ \pmod {\mathfrak p}$ assures that the c-factor appearing in the reciprocity law is integral and can be absorbed inside the cohomology class. Further, for our applications, we do not need to consider the whole cyclotomic variation, and it is enough to focus our attention to geometric twists, that is, values of s for which certain inequalities are satisfied (and in particular, the results of [Reference Kings, Loeffler and ZerbesKLZ] suffice). As anticipated before, this means that $1 \leq s < \min (k,\ell )$ .

2.5 Diagonal cycles

We finally introduce the cohomology classes obtained via diagonal cycles and their reciprocity laws, following [Reference Bertolini, Seveso and VenerucciBSV1, Reference Darmon and RotgerDR4] and [Reference Bertolini, Seveso and VenerucciBSV2, Section 3]. We also assume that the classes we are going to deal with have no denominators at p, and following the discussion of [Reference Bertolini, Seveso and VenerucciBSV2, Remark 3.3], this is always the case provided that p is greater than the weights. Consider a triple of cuspidal eigenforms $f \in S_k(N,\chi _f)$ , $g \in S_{\ell }(N,\chi _g)$ and $h \in S_m(N,\chi _h)$ , with $k+\ell +m$ even and $\chi _f \chi _g \chi _h = 1$ ; we also assume that the Galois representation attached to f is absolutely irreducible. Let $c=(k+\ell +m-2)/2$ . The diagonal cycle class is an element

(18) $$ \begin{align} \kappa_{f,g,h} \in H^1(\mathbb Q, T_{f,Y} \otimes T_{g,Y} \otimes T_{h,Y}(1-c)). \end{align} $$

When the weights are all two, the class is constructed by pushing forward the class $1 \in H_{\operatorname {\mathrm {et}}}^0(Y, \mathbb Z_p)$ along the diagonal inclusion $Y \hookrightarrow Y^3$ ; this gives an element in $H^4(Y^3,\mathbb Z_p(2))$ , which gives the desired class after applying the Hochschild–Serre map following by projection to the $(f,g,h)$ -isotypic component. Following [Reference Darmon and RotgerDR1], one can also view the diagonal class directly over the closed modular curve, which in our case is a consequence of the congruence relations we will develop (at least modulo p).

Contrary to the previous settings, the absence of a cyclotomic variable makes the situation slightly different. Fortunately, we only need the reciprocity law pointwise, at a point of weight $(k,\ell ,m)$ . If a greater level of generality was needed, we could move all three modular forms $(f,g,h)$ along a Hida (or Coleman) family, but restricting to the central twist. Although the Perrin-Riou map makes sense for the whole family of twists, since the classes are only available for the central ones, we restrict to those ones from now on.

Definition 2.7 Assume that $\alpha _f \chi _f^{-1}(p) \alpha _g^{-1} \alpha _h^{-1} \not \equiv 1$ modulo $\mathfrak p$ . Then we define $\mathcal L_{f,g,h}^{-++}$ as the morphism of $\mathbb Z_p$ -modules

$$\begin{align*}\mathcal L_{f,g,h}^{-++}: H^1(\mathbb Q_p, T_{f,Y,\circ}^{\operatorname{\mathrm{quo}}} \otimes T_{g,Y}^{\operatorname{\mathrm{sub}}} \otimes T_{h,Y}^{\operatorname{\mathrm{sub}}}(1-c)) \longrightarrow \mathcal O_{\mathfrak p} \end{align*}$$

given by

$$\begin{align*}\mathcal L_{f,g,h}^{-++} = \frac{1-\alpha_f^{-1} \beta_g^{-1} \beta_h^{-1} p^{-1}}{1-\alpha_f \beta_g \beta_h} \times \langle \log_{\operatorname{\mathrm{BK}}}, \tilde {\eta}_{f^*} \otimes \omega_{g^*} \otimes \omega_{h^*} \rangle. \end{align*}$$

For the following result, let $L_p(f^*, g^*, h^*,c)$ stand for the special value at weights $(k,\ell ,m)$ of the triple product p-adic L-function associated with the Hida families passing through $(f,g,h)$ , as introduced in [Reference Darmon and RotgerDR1, Section 4]; in particular, this corresponds to the central value of the triple product at the point $s=\frac {k+\ell +m}{2}-1=c$ . As recalled in loc. cit., we can also interpret these values in terms of a suitable pairing, from which it is clear the parallelism with the Hida–Rankin one used in previous sections.

When dealing with diagonal cycles, we implicitly fix a choice of test vectors, for instance, as in [Reference HsiehHs] (note that we can do it since the dominant p-adic L-function will never be the Eisenstein one). To keep the parallelism with the previous settings, let

$$\begin{align*}\kappa_{f,g,h,\operatorname{\mathrm{fam}}} = \mathcal E_{f,g,h} \cdot \kappa_{f,g,h}, \end{align*}$$

where $\mathcal E_{f,g,h}$ is the Euler factor

$$\begin{align*}\mathcal E_{f,g,h} = (1-\beta_f \alpha_g \beta_h p^{-c}) (1-\beta_f \beta_g \alpha_h p^{-c})(1-\alpha_f \beta_g \beta_h p^{-c}) (1-\beta_f \beta_g \beta_h p^{-c}). \end{align*}$$

We can understand this class as the result of the specialization of a class varying in Hida families.

Proposition 2.8 Under the conditions of Definition 2.7, there is an equality

$$\begin{align*}\mathcal L_{f,g,h}^{-++}(\mathrm{res}_p(\kappa_{f,g,h,\operatorname{\mathrm{fam}}})^{-++}) = L_p(f^*, g^*, h^*,c), \end{align*}$$

where $\mathrm {res}_p$ stands for the map corresponding to localization at p and $\mathrm {res}_p(\kappa _{f,g,h,\operatorname {\mathrm {fam}}})^{-++}$ is the image under the map induced in cohomology from the projection map $T_{f,Y} \otimes T_{g,Y} \otimes T_{h,Y}(1-c) \rightarrow T_{f,Y,\circ }^{\operatorname {\mathrm {quo}}} \otimes T_{g,Y}^{\operatorname {\mathrm {sub}}} \otimes T_{h,Y}^{\operatorname {\mathrm {sub}}}(1-c)$ .

Proof This follows from the reciprocity law for diagonal cycles as in, e.g., [Reference Darmon and RotgerDR1, Theorem 1.3] (see also [Reference Bertolini, Seveso and VenerucciBSV2, Section 3]).

3 Congruences between Beilinson–Flach and Beilinson–Kato classes

Let $f \in S_k(N,\chi _f)$ and $g \in S_{\ell }(N,\chi _g)$ be two cuspidal eigenforms with $\chi _g, \chi _f \chi _g \not \equiv 1\ \ \pmod {\mathfrak p}$ . We also fix an integer s with $1 \leq s < \min \{k,\ell \}$ , and introduce the auxiliary variable $m=k+\ell -2s$ . Recall that F is a finite extension of $\mathbb Q$ containing the field of coefficients of f and g, and $\mathcal O$ is its ring of integers. Fix algebraic closures $\bar {\mathbb {Q}}$ , $\bar {\mathbb {Q}}_p$ of $\mathbb {Q}$ and $\mathbb {Q}_p$ and an embedding $\bar {\mathbb {Q}} \hookrightarrow \bar {\mathbb {Q}}_p$ . This singles out a prime ideal $\mathfrak p$ of ${\mathcal O}$ lying above p, and we let $\mathcal O_{\mathfrak p} \subset \bar {\mathbb {Q}}_p$ denote the completion of $\mathcal O$ at $\mathfrak p$ . The Beilinson–Flach class we consider here is the element

$$\begin{align*}\kappa_{f,g} \in H^1(\mathbb Q, T_{f,Y} \otimes T_{g,Y}(1-s)) \end{align*}$$

introduced in Section 2.4, where we omit the dependence on s. We also assume that $\chi _g \not \equiv 1\ \ \pmod {\mathfrak p}$ .

In this section, we carry out a comparison with the image modulo $\mathfrak p^t$ of the Beilinson–Kato element

$$\begin{align*}\kappa_f \in H^1(\mathbb Q, T_{f,Y} \otimes \mathcal O/\mathfrak p^t (\ell-s)) \end{align*}$$

of Section 2.3.

Throughout all the section, we keep the following simplifying assumptions, which are implicitly used in the different results we develop. In case of needing some extra condition for a particular claim, we will state it explicitly.

  • The weak-Gorenstein condition for g, as presented in Assumption 2.1.

  • The residual Galois representation attached to f is absolutely irreducible.

Consider now the Eisenstein congruence setting, where

$$\begin{align*}g \equiv E_{\ell}(\chi_g,1)\quad \pmod{\mathfrak p^t}, \end{align*}$$

or alternatively $g^* \equiv E_{\ell }(1,\bar \chi _g)$ , which implies that $\mathfrak p^t$ divides the Bernoulli number $B_2(\bar \chi _g)$ .

Since $g \equiv E_{\ell }(\chi _g,1)$ , we may consider the projection $T_{g,Y} \otimes \mathcal O/\mathfrak p^t \longrightarrow \mathcal O/\mathfrak p^t(\chi _g)$ , that gives rise to a class

$$\begin{align*}\bar \kappa_{f,g,1} \in H^1(\mathbb Q, T_{f,Y} \otimes \mathcal O/\mathfrak p^t(\chi_g)(1-s)). \end{align*}$$

When $\bar \kappa _{f,g,1}$ vanishes, and following the arguments of [Reference Rivero and RotgerRiRo, Proposition 4.1], we may consider a putative refinement of it. In particular, from

$$\begin{align*}0 \longrightarrow T_{f,Y} \otimes T_{g,X} \longrightarrow T_{f,Y} \otimes T_{g,Y} \longrightarrow T_{f,Y} \otimes \mathcal O/\mathfrak p^t(\chi_g) \longrightarrow 0, \end{align*}$$

we may take the long exact sequence

$$\begin{align*}0 \longrightarrow H^1(\mathbb Q,T_{f,Y} \otimes T_{g,X}(1-s)) \longrightarrow H^1(\mathbb Q, T_{f,Y} \otimes T_{g,Y}(1-s)) \longrightarrow H^1(\mathbb Q, T_{f,Y} \otimes \mathcal O/\mathfrak p^t(\chi_g)(1-s)) \end{align*}$$

in which the last map sends $\kappa _{f,g}$ to $\bar \kappa _{f,g,1}$ . When the latter is zero, we may lift the class to the closed modular curve and project to the corresponding quotient. We end up with the class

$$\begin{align*}\bar \kappa_{f,g,2} \in H^1(\mathbb Q, T_{f,Y} \otimes \mathcal O/\mathfrak p^t(\ell-s)), \end{align*}$$

which also satisfies the reciprocity law of Proposition 2.6 because $T_{g,X}^{\operatorname {\mathrm {sub}}} \simeq T_{g,Y}^{\operatorname {\mathrm {sub}}}$ .

The objective of this section is to study these cohomology classes and relate them with the arithmetic of Beilinson–Kato classes. Our study rests on the Perrin-Riou theory, which requires suitable bounds on the corresponding Selmer groups coming from Iwasawa theory.

We state the assumptions that are needed to establish our results. We denote by $H_{\operatorname {\mathrm {Gr}}}^1(\mathbb Q,-)$ the subspace of $H^1(\mathbb Q,-)$ obtained by imposing the Greenberg local conditions, that is, the unramified ones at the primes $v \neq p$ and the Bloch–Kato condition at p (see, e.g., [Reference Kings, Loeffler and ZerbesKLZ, Section 11]). Further, let $H_{\operatorname {\mathrm {Gr}}}^1(\mathbb Q, - \otimes \mathcal O/\mathfrak p^t)$ be the reduction modulo $\mathfrak p^t$ of the classes in $H_{\operatorname {\mathrm {Gr}}}^1(\mathbb Q,-)$ .

We introduce now two different sets of assumptions, that are needed for the two different results that will be established.

Assumption 3.1

  1. (a) The space $H_{\operatorname {\mathrm {Gr}}}^1(\mathbb Q, T_{f,Y}(\chi _g)(1-s))$ is free of rank one over $\mathcal O_{\mathfrak p}$ .

  2. (b) It holds that

    $$\begin{align*}H^0(\mathbb Q, T_{f,Y}(\chi_g)(1-s) \otimes \mathcal O/\mathfrak p^t) = 0, \quad H^2(\mathbb Q, T_{f,Y}(\chi_g)(1-s)) = 0 \end{align*}$$

    and $\alpha _f \chi _g(p) \not \equiv 1\ \ \pmod {\mathfrak p}$ .

Assumption 3.2

  1. (a) The space $H_{\operatorname {\mathrm {Gr}}}^1(\mathbb Q, T_{f,Y}(\ell -s))$ is free of rank one.

  2. (b) It holds that $H^2(\mathbb Q, T_{f,Y}(\ell -s)) = 0$ and $\alpha _f \not \equiv 1\ \ \pmod {\mathfrak p}$ .

In the case of Assumption 3.2 (and similarly for Assumption 3.1), Kato [Reference KatoKa] proved that under big image assumptions for the representation $T_{f,Y}$ , condition (a) is true when the corresponding Kato Euler system for $T_{f,Y}(\ell -s)$ is nonzero. This can be seen as a mild condition in the cases where both classes involved in the picture are nontrivial, and which fails precisely when the order of vanishing is strictly larger than what one would expect due to sign reasons. Assumption (b) may be regarded as a condition about non-exceptional zeros which also assures that the denominator of the Perrin-Riou map does not vanish modulo $\mathfrak p$ . Further, we want to exclude the case where f is also congruent to an Eisenstein series.

Remark 3.3 A first step to understand the vanishing of the $H^0$ and $H^2$ groups in Assumption 3.1 is in terms of the local cohomology groups; note that $H^0(\mathbb Q,-)$ stands for the invariant elements under the action of $G_{\mathbb Q}$ , while $H^0(\mathbb Q_p,-)$ refers to the invariant elements under $G_{\mathbb Q_p}$ . In particular, if $H^0(\mathbb Q_p,-)=0$ , we have that $H^0(\mathbb Q,-)$ .

Then the triviality of both the local $H^0$ and the local $H^2$ may be formulated in terms of a condition over the Hecke eigenvalues. If $p>k+\ell -2$ , these are the following ones:

  • The group $H^0(\mathbb Q_p, T_{f,Y}(\chi _g)(1-s) \otimes \mathcal O/\mathfrak p^t) \neq 0$ if and only if $s=1$ and $\alpha _f \chi _g(p) \equiv 1\ \ \pmod {\mathfrak p}$ .

  • The group $H^2(\mathbb Q_p, T_{f,Y}(\chi _g)(1-s)) \neq 0$ if and only if $s=1$ and $\chi _g(p) \equiv 1\ \ \pmod {\mathfrak p}$ .

  • The group $H^2(\mathbb Q_p, T_{f,Y}(\ell -s)) \neq 0$ if and only if $s=\ell -1$ and $\alpha _f(p) \equiv 1\ \ \pmod {\mathfrak p}$ .

If $p>k+\ell -2$ and under Assumption 2.1, $H^0(\mathbb {Q}_p, T_{f,Y}(\ell -s) \otimes \mathcal O/\mathfrak p^t) = 0$ . (Observe, however, that the global $H^0$ may be zero even though the corresponding local group is nontrivial.)

Finally, note that if $p \leq k + \ell - 2$ , we must be more cautious: $H^0(\mathbb Q_p, \mathcal O/\mathfrak p(r))$ is nonzero when $r \equiv 0$ modulo $p-1$ (the cyclotomic character pulls back to the Teichmüller lift). See [Reference ManjiMan, Section 3.1] for a more elaborated discussion on that issue.

Proposition 3.4 Under the conditions of Assumption 3.1 (resp. Assumption 3.2), the Selmer group with Greenberg condition $H_{\operatorname {\mathrm {Gr}}}^1(\mathbb Q, T_{f,Y}(\chi _g)(1-s) \otimes \mathcal O/\mathfrak p^t)$ (resp. $H_{\operatorname {\mathrm {Gr}}}^1(\mathbb Q, T_{f,Y}(\ell -s) \otimes \mathcal O/\mathfrak p^t)$ ) is free of rank one over $\mathcal O/\mathfrak p^t$ .

Proof We do the proof for the case of $T_{f,Y}(\ell -s)$ , and the other case is completely analogous. Beginning with

$$\begin{align*}0 \longrightarrow T_{f,Y}(\ell-s) \xrightarrow{\times \varpi^t} T_{f,Y}(\ell-s) \longrightarrow T_{f,Y}(\ell-s)/\mathfrak p^t T_{f,Y}(\ell-s) \longrightarrow 0, \end{align*}$$

our assumptions guarantee that there is a short exact sequence

$$\begin{align*}0 \rightarrow H^1(\mathbb Q, T_{f,Y}(\ell-s)) \xrightarrow{\times \varpi^t} H^1(\mathbb Q, T_{f,Y}(\ell-s)) \rightarrow H^1(\mathbb Q, T_{f,Y}(\ell-s) \otimes \mathcal O/\mathfrak p^t) \rightarrow 0, \end{align*}$$

and therefore

$$\begin{align*}\frac{H^1(\mathbb Q, T_{f,Y}(\ell-s))}{\varpi^t H^1(\mathbb Q,T_{f,Y}(\ell-s))} \simeq H^1(\mathbb Q, T_{f,Y}(\ell-s) \otimes \mathcal O/\mathfrak p^t). \end{align*}$$

The conclusion now follows from Assumption 3.1, which allows us to say that the Greenberg Selmer group $H_{\operatorname {\mathrm {Gr}}}^1(\mathbb Q,T_{f,Y}(\chi _g)(1-s) \otimes \mathcal O/\mathfrak p^t)$ is free of rank one over $\mathcal O/\mathfrak p^t$ .

Lemma 3.5 The Bloch–Kato logarithm of Proposition 2.2 is injective.

Proof Note that $H^0(\mathbb Q_p, T_{f,Y}(\ell -s))=0$ by an immediate inspection of the Hodge–Tate weights. Then the result follows from the construction of the Bloch–Kato logarithm discussed in [Reference Kings, Loeffler and ZerbesKLZ2, Section 8.2].

The first result of this note establishes the vanishing of $\operatorname {\mathrm {loc}}_p(\bar \kappa _{f,g,1})$ under the previous assumptions. In the proof of the following result, $\kappa _f$ is the Kato class for which the auxiliary characters are $(\chi _g, 1)$ . Note that there may be interesting cases where the hypotheses fail, leading to a tantalizing connection with the theory of circular units that we expect to explore in forthcoming work.

Proposition 3.6 Suppose that the conditions of Assumption 3.1 are true. If the p-adic L-values $L_p(f^*,s), L_p(f^*,\bar \chi _g,s)$ are both nonzero modulo p, then the class $\bar \kappa _{f,g,1}$ vanishes.

Proof Using the running assumptions, the space $H_{\operatorname {\mathrm {Gr}}}^1(\mathbb Q, T_{f,Y}(\chi _g)(1-s) \otimes \mathcal O/\mathfrak p^t)$ is free of rank one and contains a canonical element, the Beilinson–Kato class $\kappa _f$ resulting from the specialization of a twist of the element $\kappa _{f,\infty }$ in Proposition 2.3.

The projection of this class to $H^1(\mathbb Q_p, T_{f,Y}^-(\chi _g)(1-s) \otimes \mathcal O/\mathfrak p^t)$ is nonzero, since its image under the Perrin-Riou regulator is precisely, up to p-adic unit, $L_p(f^*,s) \cdot L_p(f^*,\bar \chi _g,s)$ , which does not vanish due to the assumptions. However, the projection to that quotient of $\bar \kappa _{f,g,1}$ is zero because of the local properties satisfied by the Beilinson–Flach class (see [Reference Kings, Loeffler and ZerbesKLZ, Lemma 8.1.5 and Proposition 8.1.7]).

Remark 3.7 By changing the choice of the Dirichlet characters, the condition $L_p(f^*,s) \neq 0$ modulo $\mathfrak p$ may be replaced by the non-vanishing of $L_p(f^*,\chi ,s)$ , with $\chi $ nontrivial at p and of nebentype relatively prime to p. Then the core of the condition is $L_p(f^*,\bar \chi _g,s) \neq 0$ modulo p; that is, the Kato class must be nontrivial modulo p to be able to apply this argument.

When $\bar \kappa _{f,g,1}$ vanishes modulo $\mathfrak p$ , we may consider the class $\bar \kappa _{f,g,2}$ , and compare it with the previous Kato class.

The comparison we want to understand is summarized in the following diagram in the case of weight two (and therefore trivial coefficients), where the upper row gives the Beilinson–Flach class and the bottom one gives the Beilinson–Kato element.

When the cohomology class $\bar \kappa _{f,g,1}$ vanishes, we may lift the class $\kappa _{f,g}$ to an element in the cohomology with compact support and use the opposite projection. In the following result, $\kappa _f$ is the Kato class for which the auxiliary character is precisely $(1, \chi _g)$ .

Theorem 3.8 Suppose that $\bar \kappa _{f,g,1}=0$ and that the conditions of Assumption 3.2 hold. If $L_p(f^*, \bar \chi _g,s), L_p(f^*,s-\ell +1) \neq 0$ modulo p, the following congruence holds in $H^1(\mathbb Q, T_{f,Y} \otimes \mathcal O/\mathfrak p^t (\ell -s))$ :

$$\begin{align*}\bar \kappa_{f,g,2} = \bar \kappa_f. \end{align*}$$

Proof From the reciprocity laws stated as Propositions 2.3 and 2.6, we have that

$$\begin{align*}\mathcal L_f^-(\mathrm{res}_p(\kappa_{f,\infty})^-) \equiv \mathcal L_{f,g}^{-+}(\mathrm{res}_p(\kappa_{f,g,\infty})^{-+})\quad \pmod{\mathfrak p^t} \end{align*}$$

because both p-adic L-functions are congruent under the running condition on g. Using Lemma 3.5, and since the p-adic L-functions (and therefore the classes) are nonzero, we can upgrade this to the desired equality using the period relations discussed in [Reference Rivero and RotgerRiRo, Section 3.5]. The result follows from the assumptions of the statement since the Greenberg subspace of $H^1(\mathbb Q, T_{f,Y}(\ell -s) \otimes \mathcal O/\mathfrak p^t)$ is torsion-free of rank 1.

Remark 3.9 A similar approach works for extending our results to the Iwasawa cohomology classes, that is, incorporating the cyclotomic variation. In that case, some of the assumptions about the $H_{\operatorname {\mathrm {Gr}}}^1$ being free of rank one are expected to be relaxed, since in many case one can prove that the corresponding $H^1$ in families always has the desired rank.

4 Congruences between diagonal cycles and Beilinson–Flach elements

We continue the development of the theory of Eisenstein congruences between Euler systems with the case of diagonal cycles and Beilinson–Flach elements. Consider now a triple of three cuspidal eigenforms $(f,g,h)$ and nebentype $(\chi _f, \chi _g, \chi _h)$ , with common level N and with $p \nmid N$ . We assume that they satisfy the self-duality condition $\chi _f \chi _g \chi _h=1$ , and for simplicity we assume that $\chi _h \not \equiv 1\ \ \pmod {\mathfrak p}$ .

The diagonal cycle class we consider is a global element

$$\begin{align*}\kappa_{f,g,h} \in H^1(\mathbb Q, T_{f,Y} \otimes T_{g,Y} \otimes T_{h,Y}(1-c)). \end{align*}$$

In this section, we carry out a comparison with the Beilinson–Flach element

$$\begin{align*}\kappa_{f,g} \in H^1(\mathbb Q, T_{f,Y} \otimes T_{g,Y}(m-c)). \end{align*}$$

Throughout all the section, we keep the following simplifying assumptions:

  • The weak-Gorenstein condition for h, as presented in Assumption 2.1.

  • The residual Galois representations attached to f and g are absolutely irreducible, and the class $\kappa _{f,g,h}$ is integral at p.

We consider the Eisenstein congruence setting $h \equiv E_m(\chi _h,1)\ \ \pmod {\mathfrak p^t}$ . Then there is a class

$$\begin{align*}\bar \kappa_{f,g,h,1} \in H^1(\mathbb Q, T_{f,Y} \otimes T_{g,Y} \otimes \mathcal O/\mathfrak p^t(\chi_h)(1-c)). \end{align*}$$

When $\bar \kappa _{f,g,h,1}$ vanishes, and as discussed before, we may consider a putative refinement of it, namely

$$\begin{align*}\bar \kappa_{f,g,h,2} \in H^1(\mathbb Q, T_{f,Y} \otimes T_{g,Y} \otimes \mathcal O/\mathfrak p^t(m-c)), \end{align*}$$

which satisfies the reciprocity law of Proposition 2.8 because $T_{h,X}^{\operatorname {\mathrm {sub}}} \simeq T_{h,Y}^{\operatorname {\mathrm {sub}}}$ .

We begin with the following assumptions.

Assumption 4.1

  1. (a) The space $H_{\operatorname {\mathrm {Gr}}}^1(\mathbb Q, T_{f,Y} \otimes T_{g,Y}(\chi _h)(1-c))$ is free of rank one over $\mathcal O_{\mathfrak p}$ .

  2. (b) It holds that

    $$\begin{align*}\kern-12pt H^0(\mathbb Q, T_{f,Y} \otimes T_{g,Y}(\chi_h)(1-c) \otimes \mathcal O/\mathfrak p^t) = 0, \quad H^2(\mathbb Q, T_{f,Y} \otimes T_{g,Y}(\chi_h)(1-c)) = 0 \end{align*}$$
    and $\alpha _f \alpha _g^{-1} \chi _h(p), \alpha _f^{-1} \alpha _g \chi _h(p) \not \equiv 1\ \ \pmod {\mathfrak p}$ .

Assumption 4.2

  1. (a) The space $H_{\operatorname {\mathrm {Gr}}}^1(\mathbb Q, T_{f,Y} \otimes T_{g,Y}(m-c))$ is free of rank one.

  2. (b) It holds that

    $$\begin{align*}H^0(\mathbb Q, T_{f,Y} \otimes T_{g,Y} \otimes \mathcal O/\mathfrak p^t(m-c)) = 0, \quad H^2(\mathbb Q, T_{f,Y} \otimes T_{g,Y}(m-c)) = 0 \end{align*}$$
    and $\alpha _f \alpha _g^{-1} \not \equiv 1\ \ \pmod {\mathfrak p}$ .

Kings–Loeffler–Zerbes [Reference Kings, Loeffler and ZerbesKLZ] proved that under big image assumptions for the representation $T_{f,Y} \otimes T_{g,Y}$ , condition (a) is true when the corresponding Beilinson–Kato class does not vanish, so this is a relatively mild condition. Assumption (b) may be regarded as a condition for non-exceptional zeros. As before, the previous conditions may be rephrased as a condition over the Frobenius eigenvalues modulo p whenever p is large enough (in particular, $p>k+\ell +m$ is enough):

  • The group $H^0(\mathbb Q_p, T_{f,Y} \otimes T_{g,Y} \otimes \mathcal O/\mathfrak p^t(m-c)) \neq 0$ if and only if $\alpha _f(p) \equiv 1\ \ \pmod {\mathfrak p}$ and $\alpha _g(p) \equiv 1\ \ \pmod {\mathfrak p^t}$ .

  • The group $H^2(\mathbb Q_p, T_{f,Y} \otimes T_{g,Y}(\chi _h)(1-c)) \neq 0$ if and only if $\chi _h(p) \equiv 1\ \ \pmod {\mathfrak p}$ .

  • The group $H^0(\mathbb Q_p, T_{f,Y} \otimes T_{g,Y} \otimes \mathcal O/\mathfrak p^t(m-c)) \neq 0$ if and only if $\chi _h(p) \equiv 1\ \ \pmod {\mathfrak p^t}$ .

  • The group $H^2(\mathbb Q, T_{f,Y} \otimes T_{g,Y}(m-c)) \neq 0$ if and only if $\chi _f(p) \equiv 1$ or $\chi _g(p) \equiv 1\ \ \pmod {\mathfrak p}$ .

The proof of the following result is done in the same way as Proposition 3.4.

Proposition 4.3 Under the Assumption 4.2, the space $H_{\operatorname {\mathrm {Gr}}}^1(\mathbb Q, T_{f,Y} \otimes T_{g,Y} \otimes \mathcal O/\mathfrak p^t)$ is free of rank one over $\mathcal O/\mathfrak p^t$ .

The following result is proved in the same way as in the previous section using the general theory of Perrin-Riou maps.

Lemma 4.4 Assume that $H^0(\mathbb Q_p, T_{f,Y} \otimes T_{g,Y}(m-c))=0$ . Then the Bloch–Kato logarithm is injective.

We now state the first congruence concerning diagonal cycles.

Proposition 4.5 Suppose the conditions of Assumption 4.1 hold. Then, if $L_p(f^*,g^*, \bar \chi _h,c) \neq 0$ or $L_p(g^*,f^*,\bar \chi _h,c) \neq 0$ modulo p, the class $\bar \kappa _{f,g,h,1}$ vanishes.

Proof The space $H_{\operatorname {\mathrm {Gr}}}^1(\mathbb Q, T_{f,Y} \otimes T_{g,Y}(\chi _h)(1-c) \otimes \mathcal O/\mathfrak p^t)$ is free of rank one over $\mathcal O/\mathfrak p^t$ under the running assumptions. It is spanned by the Beilinson–Flach class when this is nonzero; this is the class resulting from the specialization of the element $\kappa _{f,g,\infty }$ in Theorem 2.6.

If $L_p(f^*,g^*,\bar \chi _h,c) \neq 0$ , the projection of this class to $H^1(\mathbb Q_p, T_{f,Y} \otimes T_{g,Y}^- (\chi _h) (1-c) \otimes \mathcal O/\mathfrak p^t)$ is nonzero, since its image under the Perrin-Riou regulator is precisely $L_p(f^*,g^*,\bar \chi _h,c)$ , which does not vanish due to the assumptions. However, the projection to that quotient of $\bar \kappa _{f,g,h,1}$ is zero because of the local properties satisfied by the diagonal cycle class (see [Reference Darmon and RotgerDR4, Proposition 5.8]).

When $\bar \kappa _{f,g,h,1}$ vanishes, we may lift the class to the cohomology of the open modular curve and consider a diagram like the following (in weight 2), where the upper row gives the diagonal cycle and the bottom one gives the Beilinson–Flach element. (We have shortened the notation and written $T_{f,g,h}:= T_{f,Y} \otimes T_{g,Y} \otimes T_{h,Y}$ and $T_{f,g} := T_{f,Y} \otimes T_{g,Y}$ .)

Theorem 4.6 Suppose that $\bar \kappa _{f,g,h,1}=0$ and that the conditions of Assumption 4.2 hold. If $L_p(f^*,g^*,c+1-m) \neq 0$ or $L_p(g,f,c+1-m) \neq 0$ , the following congruence holds in $H^1(\mathbb Q, T_{f,g} \otimes \mathcal O/\mathfrak p^t(m-c))$ :

$$\begin{align*}\bar \kappa_{f,g,h,2} = \bar \kappa_{f,g}. \end{align*}$$

Proof We study the congruence via the theory of Perrin-Riou maps. Consider the projection

$$\begin{align*}\pi_{f,g}^{-+} \, : \, H^1(\mathbb Q, T_{f,g}(m-c) \otimes \mathcal O/\mathfrak p^t) \longrightarrow H^1(\mathbb Q_p, T_{f,Y,\circ}^{\operatorname{\mathrm{quo}}} \otimes T_{g,Y}^{\operatorname{\mathrm{sub}}}(m-c) \otimes \mathcal O/\mathfrak p^t). \end{align*}$$

From the previous proposition and the reciprocity laws of [Reference Darmon and RotgerDR4, Reference Kings, Loeffler and ZerbesKLZ], we have that the images of $\bar \kappa _{f,g,h,2}$ and $\kappa _{f,g}$ under the appropriate Bloch–Kato logarithms agree, since the corresponding p-adic L-functions take the same value modulo $\mathfrak p^t$ from the congruence condition; this can be easily seen, for instance, using the expressions in terms of Petersson products, as in [Reference Darmon and RotgerDR1, Corollary 4.13]. When some of the two p-adic L-functions is nonzero, we can upgrade this to the equality of the statement using the period relations discussed in [Reference Rivero and RotgerRiRo, Section 3.5], and the statement follows.

Using now Lemma 4.4, we may upgrade that result to an equality in $H^1(\mathbb Q, T_{f,Y} \otimes T_{g,Y} \otimes \mathcal O/\mathfrak p^t(m-c))$ .

Remark 4.7 It would be interesting to understand these congruences in terms of the explicit geometric description of the cycles, following the seminal work of Bloch [Reference BlochBl] and the approach of [Reference Mazza, Voevodsky and WeibelMVW]. This approach, as well as others connecting different Euler systems, is based on a comparison at the level of p-adic L-functions, and it would be nice to have a more geometric understanding of this phenomenon.

Remark 4.8 A case which is specially intriguing occurs when more than one of the modular forms are congruent with Eisenstein series. However, the assumptions needed to conclude that the corresponding Greenberg cohomology spaces are free of rank one do not hold (the big image condition does not hold since the modulo $\mathfrak p$ representations are not irreducible). We expect to end up with a single class in $H^1(\mathbb Q, \mathcal O/\mathfrak p^t(2))$ , which could potentially be understood using similar techniques to those developed by Sharifi and Fukaya–Kato.

Acknowledgment

We thank Kazim Büyükboduk and David Loeffler for stimulating comments and discussions around the topics studied in this note. We are also grateful to the anonymous referee, whose comments notably contributed to improve the exposition of this note.

Footnotes

This project has received funding from the European Research Council (ERC) under the European Union’s Horizon 2020 research and innovation program (Grant Agreement No. 682152). Ó.R. was further supported by the Royal Society Newton International Fellowship (Grant No. NIF$\backslash$R1$\backslash$202208). V.R. is supported by Icrea through an Icrea Academia Grant. This material is based upon work supported by the National Science Foundation under Grant No. DMS-1928930 while Ó.R. was in residence at the Mathematical Sciences Research Institute in Berkeley, California, during the Spring 2023 semester.

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