Proof of Theorem 1.1

As in §1, we let $M:={1}/{\lvert S\rvert }\sum _{s\in S}s\in \mathbb C[\Gamma ]$ . We have the following identity between the unitary representations of $\Gamma $ :

$$ \begin{align*} L^2(H_1\backslash \Gamma)\otimes L^2(H_2\backslash \Gamma)\simeq \bigoplus_{g\in H_1\backslash \Gamma/H_2} L^2((H_1\cap H_2^g)\backslash \Gamma). \end{align*} $$

Write $\pi _1,\pi _2$ for the unitary representations corresponding to $L^2(H_1\backslash \Gamma )$ and $L^2(H_2\backslash \Gamma )$ . The above identity implies that

$$ \begin{align*} \sup_{g\in H_1\backslash \Gamma/H_2} \rho((H_1\cap H_2^g)\backslash \Gamma)=\lVert (\pi_1\otimes \pi_2)(M)\rVert. \end{align*} $$

To prove the theorem, it is enough to verify that

$$ \begin{align*} \lVert (\pi_1\otimes \pi_2)(M)\rVert \geq \lVert \pi_2(M)\rVert =\rho(H_2\backslash \Gamma). \end{align*} $$

Let $\varepsilon>0$ . Choose unit vectors $u_1\in L^2(H_1\backslash \Gamma )$ and $u_2\in L^2(H_2\backslash \Gamma )$ such that $\langle \pi _1(s)u_1, u_1\rangle \geq 1-\varepsilon $ for all $s\in S$ and $\langle \pi _2(M)u_2,u_2\rangle \geq \lVert \pi _2(M)\rVert -\varepsilon $ . Then,

$$ \begin{align*}\langle (\pi_1\otimes \pi_2)(M) u_1\otimes u_2,u_1\otimes u_2\rangle &=\frac{1}{\lvert S\rvert }\sum_{s\in s} \langle \pi_1(s)u_1,u_1\rangle \langle \pi_2(s)u_2,u_2\rangle\\ &\geq \frac{1}{\lvert S\rvert }\sum_{s\in S} (1-\varepsilon)\langle \pi_2(s)u_2,u_2\rangle\\ &\geq (1-\varepsilon)(\lVert \pi_2(M)\rVert - \varepsilon).\end{align*} $$

Letting $\varepsilon \to 0$ , we conclude that $\lVert (\pi _1\otimes \pi _2)(M)\rVert \geq \lVert \pi _2(M)\rVert .$

Proof. By passing to ergodic components, we can assume without loss of generality that $(X,\nu )$ is ergodic. If $(X,\nu )$ is periodic, then there is nothing to do, so henceforth we will assume that $(X,\nu )$ is an aperiodic measure-preserving ergodic system.

First, let us prove that if the co-spectral radius of the stabilizer $\Gamma _x$ is at least $\unicode{x3bb} $ , then X has embedded spectral radius at least $\unicode{x3bb} $ . Let $\varepsilon>0$ be arbitrary. Then $\nu $ -almost every orbit $\mathcal {G}_x$ supports a function $f_x:\mathcal {G}_x\to {\mathbb {R}}$ such that

(4.1) $$ \begin{align} \langle (I-M)f_x,f_x\rangle \leq (1-\unicode{x3bb}+\varepsilon)\lVert f_x\rVert^2. \end{align} $$

Since $\mathcal {G}_x$ is countable, using the monotone convergence theorem, we can assume $f_x$ is supported on a finite ball. Let $R_x>0$ be minimal such that the interior of the ball $B_{\mathcal G_x}(x,R_x)$ of radius $R_x$ around x supports a function $\psi _x$ satisfying equation (4.1). Since balls of fixed radius depend measurably on x, the map $x\mapsto R_x$ is measurable, so we can choose $R_0>0$ such that

$$ \begin{align*}\nu\, (\{x\in X \mid R_x\leq R_0\})>0\end{align*} $$

and put $X_1:=\{x\in X \mid R_x\leq R_0\}.$ Since there are only finitely many rooted graphs of radius $R_0$ labeled by S, there exists a positive measure set $X_2\subset X_1$ such that for all $x\in X_2$ , the rooted graphs $(B_{\mathcal G_x}(x,R_0),x)$ are all isomorphic to some $(\mathcal G,o)$ as rooted S-labeled graphs. By restricting to a smaller subset, we can assume that $\nu (X_2)$ is finite. Fix $\psi :\mathcal {G}\to {\mathbb {R}}$ satisfying

$$ \begin{align*}\langle (I-M)\psi, \psi\rangle \leq (1-\unicode{x3bb}+\varepsilon)\lVert \psi\rVert^2, \end{align*} $$

and for $x\in X_2$ , let $B_x\subset X$ be the image of $\mathcal {G}$ via the unique labeled isomorphism $(\mathcal G,o)\simeq (B_{\mathcal {G}_x}(x,R_0),x)$ .

Let $S'$ be the set of all products of at most $2R_0$ elements of S. At this point, we need to use a Rokhlin-type lemma, which will be stated and proved below (see Lemma 4.6). Upon applying this to the graphing $(S'X_2,\nu , S')$ , we find a partition $S'X_2=B\sqcup \bigsqcup _{j=1}^N A_j$ with $\nu (B)<\nu (X_2)/2$ , such that $A_j\cap sA_j=\{x\in A_j\mid sx=x\}$ for every $s\in S'$ . This translates to the condition that $B_{x}$ and $B_{x'}$ are disjoint for every distinct pair of points $x,y \in A_j$ . Since the sets $A_j$ cover a subset of $X_2$ of measure at least $\nu (X_2)/2$ , there exists j such that $X_3:=X_2\cap A_j$ has positive measure. The set $P:=\bigcup _{x\in X_3} B_x$ is then a disjoint union of its finite connected components $B_x$ , so it is a finite connected component in the sense of Definition 4.1. The function $\psi :\mathcal {G}\to {\mathbb {R}}$ naturally induces a function $f:P\to {\mathbb {R}}$ defined by $f|_{B_x} := \psi $ for all $x\in X_3$ , where we have identified $B_x$ with $\mathcal {G}$ using the isomorphism of rooted S-labeled graphs $(B_x, x)\simeq (\mathcal {G},o)$ .

Then, we easily verify $\langle (I-M)f, f\rangle \leq (1-\unicode{x3bb} +\varepsilon )\lVert f\rVert ^2$ , namely

$$ \begin{align*}\lVert f\rVert^2 = \int_{X_3} \lVert\psi\rVert^2\,d\nu = \nu(X_3) \lVert\psi\rVert^2,\end{align*} $$

and similarly

$$ \begin{align*} \langle Mf, f\rangle = \int_{X_3} \langle M\psi,\psi\rangle \, d\nu = \nu(X_3) \langle M\psi , \psi\rangle.\end{align*} $$

Taking $\varepsilon \to 0$ , we see that X has embedded spectral radius at least $\unicode{x3bb} $ .

We prove the other direction. The proof will use the mass transport principle for unimodular random graphs. In our case, the unimodular random graph is given by $(\mathcal G_x,x)$ where $x\in X$ is $\nu |_P$ -random. We argue by contradiction, so assume that $(X,\nu )$ has embedded spectral radius at least $\unicode{x3bb} $ but, at the same time, stabilizers have co-spectral radius $\rho <\unicode{x3bb} $ with positive probability. By ergodicity, there exists an $h>0$ such that $\rho (\mathcal {G}_x)\leq \unicode{x3bb} -h$ almost surely.

Since X has spectral radius at least $\unicode{x3bb} $ , there exists $f\in L^2(X,\nu )$ non-zero and supported on the interior of a finite connected component $P\subseteq X$ with $\nu (P)<\infty $ such that

(4.2) $$ \begin{align} \langle (I-M)f,f\rangle \leq \bigg(1-\unicode{x3bb}+\frac{h}{2}\bigg)\lVert f\rVert^2.\end{align} $$

As in §2.4, let $\mathcal {R}_P$ be the equivalence relation generated by the graphing on P. We write $P_x^o:=[x]_{\mathcal {R}_P}$ for the connected component of $x\in P$ . Define $K:\mathcal {R}_P\to {\mathbb {R}}$ by

(4.3) $$ \begin{align} K(x,y):=\frac{f(x)^2}{\lVert f\rVert_{P_x^o}^2} (2\lvert S\rvert)^{-1} \sum_{s\in S} (f(ys)-f(y))^2. \end{align} $$

By the mass transport principle, we equate

(4.4) $$ \begin{align} \int_P \sum_{x\in P_y^o} K(x,y)\,d\nu(y) = \int_P \sum_{y\in P_x^o} K(x,y)\,d\nu(x). \end{align} $$

We start by computing the integrand on the right-hand side. Rewriting

$$ \begin{align*}(f(ys)-f(y))^2=f(ys)(f(ys)-f(y))+f(y)(f(y)-f(ys)),\end{align*} $$

we find (using S is symmetric) for every $x\in X$ that

$$ \begin{align*} \sum_{y\in P_x^o} K(x,y) &= \frac{f(x)^2}{\lVert f\rVert_{P_x^o}^2} \lvert S\rvert^{-1} \sum_{y\in P_x^o} \sum_{s\in S} f(y) (f(y)-f(ys)) \\ &= \frac{f(x)^2}{\lVert f\rVert_{P_x^o}^2} \langle (I-M)f, f\rangle_{P_x^o}. \end{align*} $$

Using $\rho (\mathcal {G}_x)\leq \unicode{x3bb} -h$ and $f\geq 0$ , we can estimate

(4.5) $$ \begin{align} \sum_{y\in P_x^o} K(x,y)\geq (1-\unicode{x3bb}+h) f(x)^2. \end{align} $$

Therefore, we have the following estimate for the right-hand side in the mass transport equation (4.4):

(4.6) $$ \begin{align} \int_P \bigg(\sum_{y\in P_x^o} K(x,y)\bigg) \, d\nu(x)\geq (1-\unicode{x3bb}+h) \lVert f\rVert^2. \end{align} $$

Next, we compute the integrand on the left-hand side of the mass transport equation (4.4), namely for $y\in X$ , we have

$$ \begin{align*} \sum_{x\in P_y^o} K(x,y) &= \sum_{x\in P_y^o} \frac{f(x)^2}{\lVert f\rVert^2_{P_y^o}} (2\lvert S\rvert)^{-1} \sum_{s\in S} (f(ys)-f(y))^2 \\ &= f(y)(I-M)(f)(y), \end{align*} $$

where we used S is symmetric and the action is measure-preserving. Hence, integrating the above equation over y and using the mass transport principle to estimate this by the right-hand side of equation (4.6), we find

$$ \begin{align*}\langle (I-M)f,f\rangle \geq (1-\unicode{x3bb}+h)\lVert f\rVert^2.\end{align*} $$

This contradicts the choice of f in equation (4.2).

Proof. We start by proving the lemma for a single measure-preserving invertible map $\varphi \colon U\to \varphi (U).$ Since we do not assume that $\varphi $ is defined on all of X, we need to treat separately the subset of elements where $\varphi $ can be applied only finitely many times. For any $n\in \mathbb N$ , define

$$ \begin{align*} E_n:=\{x\in X\mid \varphi^{n-1}(x)\in U\ \text{but}\ \varphi^n(x)\not\in U\}. \end{align*} $$

Put $A_{\mathrm {0}}=\bigcup _{n=0}^\infty E_{2n}$ and $A_{\mathrm {1}}=\bigcup _{n=0}^\infty E_{2n+1}.$ We obviously have $A_0\cap A_1=\emptyset $ , $\varphi ^{\pm 1}(A_0)\subset A_1$ , and $\varphi ^{\pm 1}(A_1)\subset A_0$ . This reduces the problem to the subset $Y:=X\setminus \bigcup _{n=0}^\infty E_n$ . By definition, $\varphi (Y)=Y$ . We further decompose Y into the periodic and aperiodic parts $Y^{\mathrm {p}}, Y^{\mathrm {ap}}$ . The periodic part can be partitioned into a fixed point set $A_2=\{x\in Y^{\mathrm {p}}\mid \varphi (x)=x\}$ , finitely many sets $A_3,\ldots , A_M$ permuted by $\varphi $ , and a remainder $B_1$ of measure $\nu (B_1)<\delta /2$ coming from large odd periods. By the usual Rokhlin lemma, the aperiodic part $Y^{\mathrm {ap}}$ can be decomposed as $Y^{\mathrm {ap}}=B_2\sqcup A_{M+1}\sqcup \cdots \sqcup A_N$ , where $\nu (B_2)<\delta /2$ , $\varphi (A_{M+k})=A_{M+k+1}$ for all $M+k<N$ and $\varphi (A_N)\subset B_2.$ Put $B=B_1\cup B_2$ . This ends the construction for a single map.

Suppose now that the graphing consists of d maps $\varphi _1,\ldots ,\varphi _d$ and their inverses. For each $i=1,\ldots d$ , there exists a partition $X=B^i\sqcup \bigsqcup _{j=1}^{N_i}A_j^i$ such that $\nu (B^i)< {\delta }/{d}$ and $\varphi _i (A_j^i\cap U_i)\cap A_j^i= \{x\in (A_j^i\cap U_i) \mid \varphi _i(x)=x\}.$ Let $B:=\bigcup _{i=1}^d B^i$ and define the partition $\{A_j\}$ as the product partition $\bigwedge _{i=1}^d \{A_j^i\}.$ This partition satisfies all the desired conditions.