Hostname: page-component-586b7cd67f-t7czq Total loading time: 0 Render date: 2024-11-28T04:20:41.984Z Has data issue: false hasContentIssue false

Measure-theoretic sequence entropy pairs and mean sensitivity

Published online by Cambridge University Press:  19 September 2023

FELIPE GARCÍA-RAMOS*
Affiliation:
Universidad Autonoma de San Luis Potosi, San Luis Potosi 78000, Mexico (e-mail: [email protected]) Faculty of Mathematics and Computer Science, Jagiellonian University, Profesora Stanisława Łojasiewicza 6, 30-348 Kraków, Poland
VÍCTOR MUÑOZ-LÓPEZ
Affiliation:
Universidad Autonoma de San Luis Potosi, San Luis Potosi 78000, Mexico (e-mail: [email protected])
Rights & Permissions [Opens in a new window]

Abstract

We characterize measure-theoretic sequence entropy pairs of continuous actions of abelian groups using mean sensitivity. This addresses an open question of Li and Yu [On mean sensitive tuples. J. Differential Equations 297 (2021), 175–200]. As a consequence of our results, we provide a simpler characterization of Kerr and Li’s independence sequence entropy pairs ($\mu $-IN-pairs) when the measure is ergodic and the group is abelian.

Type
Original Article
Copyright
© The Author(s), 2023. Published by Cambridge University Press

1 Introduction

Given a dynamical system (or a group action) with positive entropy, one might wonder which points of the phase space contribute to the entropy (and which do not). One approach to answer this question was given in Blanchard’s seminal paper [Reference Blanchard2], where entropy pairs were introduced. In this approach, the answer to this question is not a subset of the phase space X but a subset of the product space $X^2$ . It turns out that a system has positive topological entropy if and only if there is an entropy pair. This sets the basis of what is now known as local entropy theory (see the surveys [Reference García-Ramos and Li10, Reference Glasner and Ye12]). This theory has provided ground for building new bridges from dynamics to other areas of mathematics like combinatorics [Reference Kerr and Li16], point-set topology [Reference Darji and Kato6], group theory, operator algebras [Reference Barbieri, García-Ramos and Li1, Reference Chung and Li4], and descriptive set theory [Reference Darji and García-Ramos5]. Of particular interest is Kerr and Li’s characterization of entropy pairs of continuous actions of amenable groups using a combinatorial notion of independence [Reference Kerr and Li16].

Positive (measure) entropy can also be localized using measure entropy pairs for a measure (as defined in [Reference Blanchard, Host, Maass, Martinez and Rudolph3]). Furthermore, these pairs can also be characterized using a different notion of combinatorial independence [Reference Kerr and Li17]. However, the definition of independence used for this characterization is quite more involved and technical than the topological one (see §2.4). The aim of this paper is to bring more clarity to the measure-theoretic theory of independence pairs in the particular case of sequence entropy.

Sequence entropy was introduced by Kushnirenko, and it provided the first link between the functional analytic ergodic theory of von Neumann and the entropy-related ergodic theory of Kolmogorov’s school by proving that a system has pure point spectrum if and only if it has zero sequence entropy [Reference Kushnirenko18]. As in the classic case, sequence entropy pairs appear exactly when a system has positive measure sequence entropy [Reference Huang, Maass and Ye15]. By using arbitrarily large sets instead of positive density, Kerr and Li also characterized sequence entropy pairs using independence [Reference Kerr and Li16, Reference Kerr and Li17].

We characterize measure sequence entropy pairs of abelian group actions (Theorem 3.6) using the so-called mean sensitivity pairs (introduced in [Reference García-Ramos8]). This addresses an open question mentioned in the introduction of [Reference Li and Yu21]. Mean sensitivity with respect to a measure is a statistical version of sensitivity to initial conditions used in chaotic dynamics. As an application of our result, we provide a simpler version of independence pairs for sequence entropy (Theorem 3.8).

There are previous results that indicate that sequence entropy pairs satisfy some type of sensitivity with respect to a measure [Reference Huang, Lu and Ye14, Reference Li and Tu20]. Nonetheless, those previous studied notions were too weak to induce a characterization.

Theorem 3.6 is a local version of [Reference García-Ramos8, Theorem 38]. Nonetheless, an important difference is that while the global result holds for general Borel invariant measures [Reference Huang, Li, Thouvenot, Xu and Ye13, Theorem 4.7], the local characterization may fail if the measure is not ergodic [Reference Li, Liu, Tu and Yu19, Theorem 1.6]. Theorem 3.6 was obtained independently in the case where in [Reference Li, Liu, Tu and Yu19] using different tools.

The paper is organized as follows. In §2, we give definitions of the main concepts used in the paper (such as entropy, independence, and sensitivity). In §3, we prove the main technical lemma (Lemma 3.5) and the main results of the paper (Theorems 3.6 and 3.8). Finally, in §4, we introduce a stronger definition, diam-mean sensitivity pairs; these pairs are always sequence entropy pairs but we do not know if the converse holds.

2 Preliminaries

Throughout this paper, X represents a compact metrizable space with a compatible metric d. We denote by $\mathcal {B}(X)$ the set of all Borel sets of X. Given $\mu $ , a Borel probability measure on X, we denote the set of all Borel sets with positive measure by $\mathcal {B}_{\mu }^{+}(X)$ .

2.1 Amenable groups

In this paper, G denotes a countable group with identity e. The inverse of a point $g\in G$ will be denoted by $g^{-1}$ . A sequence of non-empty finite subsets of G is called a Følner sequence if

$$ \begin{align*} \lim_{n\to\infty}|sF_n\Delta F_n|/|F_n|\to 0 \end{align*} $$

for every $s\in G$ . In general, we will simply denote this sequence with $\{F_n\}$ . A group is called amenable if it admits a Følner sequence. Every abelian group is amenable.

Let $\{F_n\}$ be a Følner sequence for G and $S\subseteq G$ . We define the lower density of S as

$$ \begin{align*}\underline{D}(S)=\liminf_{n\to\infty} \frac{|S\cap F_n|}{|F_n|},\end{align*} $$

and the upper density of S as

$$ \begin{align*}\overline{D}(S)=\limsup_{n\to\infty} \frac{|S\cap F_n|}{|F_n|}.\end{align*} $$

Definition 2.1. Let $ \{F_n\} $ be a Følner sequence for G. We say that $\{F_n\}$ is tempered if there exists $C>0$ such that

$$ \begin{align*}\bigg|\bigcup_{k=1}^{n-1} F_k^{-1}F_n\bigg|\leq C |F_n|\quad \mbox{for all } n>1.\end{align*} $$

Every Følner sequence has a subsequence that is tempered [Reference Lindenstrauss22, Proposition 1.5].

2.2 Group actions and sequence entropy

By an action of the group G on X, we mean a map $\alpha \colon G \times X \rightarrow X$ such that $\alpha (s,\alpha (t,x)) = \alpha (st,x)$ and $\alpha (e,x) = x$ for all $x \in X$ and $s,t\in G$ . For simplicity, we refer to the action as $G\curvearrowright X$ and we denote the image of a pair $(s,x)$ as $sx$ .

Given a continuous group action $G\curvearrowright X$ , we say a Borel probability measure is ergodic if it is G-invariant and every G-invariant measurable set has measure $0$ or $1$ . Throughout this paper, every measure is a Borel probability measure and we will omit writing this.

Theorem 2.2. [Reference Lindenstrauss22, Theorem 1.2]

Let $G\curvearrowright X$ be a continuous action, $\mu $ an ergodic measure, f an integrable function, and $\{F_n\}$ a tempered Følner sequence. Then,

$$ \begin{align*}\lim_{n\to\infty}\frac{1}{|F_n|} \sum_{s\in F_n} f(sx)=\int f(x) d\mu(x) \quad\mu\mbox{-almost everywhere.}\end{align*} $$

Let A be a measurable set. We say x is a generic point for A if it satisfies the pointwise ergodic theorem for $f=1_A$ .

Let $G\curvearrowright X$ be a continuous action, $\mu $ a G-invariant measure, $S=\{s_i\}_{i=0}^\infty $ a sequence in G, and $\mathcal {P}$ a finite measurable partition of X. The Shannon entropy of $\mathcal {P}$ is given by

$$ \begin{align*}H_\mu(\mathcal{P})=-\sum_{A\in\mathcal{P}}\mu(A)\log\mu(A).\end{align*} $$

The sequence entropy of $G\curvearrowright X$ along S with respect to $\mu $ and $\mathcal {P}$ is defined by

$$ \begin{align*}h_\mu^S(X,G,\mathcal{P})=\limsup_{n\to\infty} \frac{1}{n} H_\mu\bigg( \bigvee_{i=0}^{n-1} {s^{-1}_i}\mathcal{P} \bigg).\end{align*} $$

The sequence entropy of $G\curvearrowright X$ along S with respect to $\mu $ is

$$ \begin{align*}h_\mu^S(X,G)=\sup_{\mathcal{P}} h_\mu^S(X,G,\mathcal{P}),\end{align*} $$

where the supremum is taken over all finite measurable partitions $\mathcal {P}$ .

Sequence entropy can be studied locally using sequence entropy pairs, introduced in [Reference Huang, Maass and Ye15].

Definition 2.3. Let $G\curvearrowright X$ be a continuous group action and $\mu $ an invariant measure. We say that $(x,y)\in X^2$ is a $\mu $ -sequence entropy pair if $x\neq y$ and for any finite measurable partition $\mathcal {P}$ , such that there is no $P\in \mathcal {P}$ with $x,y\in \overline {P}$ , there exists a sequence, S, in G with $h_\mu ^S(X,\mathcal {P})>0$ .

2.3 Mean sensitivity

Sensitivity with respect to a measure was introduced in [Reference Huang, Lu and Ye14]. Mean sensitivity with respect to a measure is a statistical form of sensitivity introduced in [Reference García-Ramos8]. In contrast with $\mu $ -sensitivity, $\mu $ -mean sensitivity is invariant under measure isomorphism.

Definition 2.4. Let $\{F_n\}$ be a Følner sequence for G, $G\curvearrowright X$ a continuous group action, and $\mu $ a measure on X. We say that $G\curvearrowright X$ is $\mu $ -mean sensitive if there exists $\epsilon>0$ such that for every $A\in \mathcal {B}_{\mu }^{+}(X)$ , there exist $x,y\in A$ such that

$$ \begin{align*}\limsup_{n\to\infty} \frac{1}{|F_n|}\sum_{s\in F_n} d(sx,sy)>\epsilon.\end{align*} $$

Remark 2.5. Let $\mu $ be an ergodic measure and $\{F_n\}$ a Følner sequence for G. An action is $\mu $ -mean sensitive if and only if it is not $\mu $ -mean equicontinuous [Reference García-Ramos8, Theorem 26] (while the result is stated for actions of $\mathbb {Z}^d$ , the same proof holds for any action of an amenable group). Furthermore, an action is $\mu $ -mean equicontinuous with respect to a tempered Følner sequence if and only if it has discrete spectrum [Reference García-Ramos8, Corollary 39], [Reference Yu, Zhang and Zhang23, Theorem 1.3]. Since discrete spectrum does not depend on the choice of the Følner sequence, we conclude that if $\mu $ -mean sensitivity holds for one tempered Følner sequence (and $\mu $ ergodic), it must hold for all. The role of non-tempered Følner sequences was studied for mean equicontinuity in [Reference Fuhrmann, Gröger and Lenz7]. Such study has not been done for $\mu $ -mean equicontinuity.

Now we will define the local notion of the previous definition.

Definition 2.6. Let $\{F_n\}$ be a Følner sequence for G, $G\curvearrowright X$ a continuous group action, and $\mu $ an invariant measure. We say that $(x,y) \in X^2$ is a $\mu $ -mean sensitivity pair if $x\neq y$ and for all open neighborhoods $U_x$ of x and $U_y$ of y, there exists $\epsilon>0$ such that for every $A\in \mathcal {B}_\mu ^{+}(X)$ , there exist $p,q\in A$ such that

$$ \begin{align*}\overline{D}(\{s\in G: sp\in U_x \mbox{ and } sq\in U_y\})>\epsilon.\end{align*} $$

We denote the set of $\mu $ -mean sensitivity pairs by $S_\mu ^m(X,G)$ .

We will now define sensitivity with respect to an $L^2$ function.

Definition 2.7. Let $\{F_n\}$ be a Følner sequence for G, $G\curvearrowright X$ a continuous group action, $\mu $ a measure on X, and $f\in L^2(X,\mu )$ . We define

$$ \begin{align*}d_f(x,y)=\limsup_{n\to\infty}\bigg( \frac{1}{|F_n|}\sum_{s\in F_n} |f(sx)-f(sy)|^2\bigg)^{1/2}.\end{align*} $$

Definition 2.8. Let $\{F_n\}$ be a Følner sequence for G, $G\curvearrowright X$ a continuous group action, $\mu $ an invariant measure, and $f\in L^2(X,\mu )$ . We say that $G\curvearrowright X$ is $\mu $ -f-mean sensitive if there exists $\epsilon>0$ such that for every $A\in \mathcal {B}_{\mu }^{+}(X)$ , there exist $x,y\in A$ such that $d_f(x,y)>\epsilon $ . In this case, we say that f is $\mu $ -mean sensitive. We denote the set of $\mu $ -mean sensitive functions with $H_{ms}$ .

Remark 2.9. We have that $G\curvearrowright X$ is $\mu $ - $1_B$ -mean sensitive if and only if there exists $\epsilon ~>~0$ such that for every $A\in \mathcal {B}_{\mu }^{+}(X)$ , there exist $p,q\in A$ such that $\overline {D}(\{s\in G: sp\in B$ and $sq \in B^c\})>\epsilon $ .

2.4 Independence

The following definitions were introduced in [Reference Kerr and Li17].

Definition 2.10. Let $(A_1,A_2)$ be a pair of subsets of X and $E:G\to 2^X$ a function. We say that a set $I\subseteq G$ is an independence set for $(A_1,A_2)$ relative to E if for every non-empty finite subset $F\subseteq I$ and any map $\sigma :F\to \{1,2\}$ , we have $\bigcap _{s\in F}(E(s)\cap s^{-1}A_{\sigma (s)}) \neq \emptyset $ .

We say that I is a independence set for $(A_1,A_2)$ relative to $D\subseteq X$ if it is an independence set for $(A_1,A_2)$ relative to the constant function given by $E(s)=D$ for all $s\in G$ .

We denote by $\mathcal {B}^{\prime }_{\mu }(X,\epsilon )$ the set of all maps $E:G\to \mathcal {B}(X)$ such that $\mu (E(s))\geq 1-\epsilon $ for all $s\in G$ .

Definition 2.11. Let $G\curvearrowright X$ be a continuous group action and $\mu $ an invariant measure. For $A_1,A_2\subseteq X$ and $\epsilon>0$ , we say that $(A_1,A_2)$ has $(\epsilon ,\mu )$ -independence over arbitrarily large finite sets if there exists $c>0$ such that for every $N>0$ , there is a finite set $F\subseteq G$ with $|F|>N$ such that for every $E\in \mathcal {B}^{\prime }_{\mu }(X,\epsilon )$ , there is an independence set $I\subseteq F$ for $(A_1,A_2)$ relative to E with $|I|\geq c|F|$ .

Definition 2.12. Let $G\curvearrowright X$ be a continuous group action and $\mu $ an invariant measure. We say that $(x,y)\in X^2$ is a $\mu $ - $IN$ pair if for every product neighborhood $U_x\times U_y$ of $(x,y)$ , there exists $\epsilon>0$ such that $(U_x,U_y)$ has $(\epsilon ,\mu )$ -independence over arbitrarily large finite sets.

Theorem 2.13. [Reference Kerr and Li17, Theorem 4.9]

Let $G\curvearrowright X$ be a continuous group action and $\mu $ an invariant measure. A pair $(x,y)\in X^2$ with $x\neq y$ is an $\mu $ - $IN$ pair if and only if it is a $\mu $ -sequence entropy pair.

2.5 Almost periodicity

Let $G\curvearrowright X$ be a continuous group action and $\mu $ an invariant measure. We define the Koopman representation $\kappa :G \to \mathcal {B}(L^2(X,\mu ))$ by $\kappa (s)f(x)=f(s^{-1}x)$ for all $s\in G$ , $f\in L^2$ , and $x\in X$ , where $\mathcal {B}(L^2(X,\mu ))$ is the space of all bounded linear operators on $L^2(X,\mu )$ .

Definition 2.14. Let $G\curvearrowright X$ be a continuous group action, $\mu $ an invariant measure, and $f\in L^2(X,\mu )$ . We say that f is an almost periodic function if $\overline {\kappa (G)(f)}$ is compact as a subset of $L^2(X,\mu )$ . We denote by $H_{ap}$ the set of almost periodic functions.

Theorem 2.15. [Reference García-Ramos and Marcus11, Theorem 1.15]

Let G be an abelian group, $\{F_n\}$ a tempered Følner sequence, $G\curvearrowright X$ a continuous group action, and $\mu $ an ergodic measure. We have that $H_{ms}=H_{ap}^c$ .

3 Characterization of sequence entropy pairs

3.1 Mean sensitivity pairs

Lemma 3.1. [Reference Kushnirenko18]

Let $(X,\mu )$ be a probability space and $\{\xi _n\}$ be a sequence of two-set measurable partitions of X, with $\xi _n=\{P_n,P_n^c\}$ . The closure of $\{1_{P_1},1_{P_2},\ldots \}\subseteq L^2(X,\mu )$ is compact if and only if for all increasing sequences of integers,

$$ \begin{align*}\lim_{n\to \infty} \frac{1}{n}H\bigg(\bigvee_{i=1}^n \xi_{m_i}\bigg)=0.\end{align*} $$

The next theorem is obtained directly from Lemma 3.1.

Theorem 3.2. Let $G\curvearrowright X$ be a continuous group action, $\mu $ an invariant measure, and $B\in \mathcal {B}_{\mu }^{+}(X)$ . Then $1_B\in H_{ap}$ if and only if $h_\mu ^{\mathcal {S}}(X,\{A,A^c\})=0$ for any sequence $S\subseteq G$ .

Proposition 3.3. Let G be an abelian group, $\{F_n\}$ a tempered Følner sequence for G, $G\curvearrowright X$ a continuous group action, and $\mu $ an ergodic measure. If $(x,y)\in X^2$ is a $\mu $ -mean sensitivity pair, then it is a $\mu $ -sequence entropy pair.

Proof. Let $(x,y)$ be a $\mu $ -mean sensitivity pair and $\mathcal {P}=\{P,P^c\}$ a finite partition, such that $x\in P\setminus \overline {P^c}$ and $y\in P^c\setminus \overline { P}$ . This implies that there exist neighborhoods $U_x$ of x and $U_y$ of y, such that $U_x\subseteq P$ and $U_y\subseteq P^c$ . Note that $G\curvearrowright X$ is $\mu $ - $1_P$ -mean sensitive. Hence, by Theorems 2.15 and 3.2, we obtain that there exists $S\subseteq G$ such that $h_\mu ^S(X,\mathcal {P})>0$ . Thus, $(x,y)$ is a $\mu $ -sequence entropy pair.

The following lemma is standard, e.g. see [Reference Huang, Lu and Ye14, Proposition 5.8].

Lemma 3.4. Let $(X,\mathcal {B}(X),\mu )$ be a Borel probability space, $a>0$ , and $\{E_s\}_{s\in G}$ a sequence of measurable sets with $\mu (E_s)\geq a$ for all $s\in G$ . There exists such that for any set $F\subseteq G$ with $|F|\geq N$ , there exist $s_F,t_F\in F$ such that $s_F\neq t_F$ and $\mu (E_{s_F}\cap E_{t_F})>0$ .

The following lemma is the main tool used to provide a connection between independence over finite sets and sensitivity.

Lemma 3.5. Let $G\curvearrowright X$ be a continuous group action, $\mu $ an ergodic measure, $U_x,U_y\subseteq X$ open sets, and $\varepsilon>0$ . If $(U_x,U_y)$ has $(\epsilon ,\mu )$ -independence over arbitrarily large finite sets, then for every $A\in \mathcal {B}_{\mu }^{+}(X)$ , there exists $(s_A,t_A)\in R_A$ such that $\mu (s_A^{-1}U_x\cap t_A^{-1}U_y)~>~\epsilon $ , where

$$ \begin{align*}R_A=\{(s,t)\in G^2:\mu(s^{-1}A\cap t^{-1}A)>0\}.\end{align*} $$

Proof. We will prove this by contradiction. Assume that there exists $A\in \mathcal {B}_{\mu }^{+}(X)$ such that

$$ \begin{align*}\mu(s^{-1}U_x\cap t^{-1}U_y)\leq\epsilon\end{align*} $$

for all $(s,t)\in R_A$ . This implies that $\mu ((s^{-1}U_x\cap t^{-1}U_y)^c)\geq 1-\epsilon $ for all $(s,t)\in R_A$ .

By the independence hypothesis, there exists $c>0$ which satisfies the definition of $(\epsilon ,\mu )$ -independence over arbitrarily large finite sets (Definition 2.11). Using Lemma 3.4 on $\{E_s\}_{s\in G}$ with $E_s=s^{-1}A$ , we conclude that there is $N_0>0$ such that for any finite set $F\subseteq G$ with $|F|\geq N_0$ , there exist $s_F,t_F\in F$ such that $s_F\neq t_F$ and

$$ \begin{align*}\mu(s_F^{-1}A\cap t_F^{-1}A)>0.\end{align*} $$

Using Definition 2.11, there exists a finite set $F_0$ with $|F_0|\geq N_0/c$ such that for every $E\in \mathcal {B}^{\prime }_{\mu }(X,\epsilon )$ , there is an independence set $I\subseteq F_0$ such that $|I|\geq c |F_0|\geq N_0$ . This implies that for every $\sigma :I\to \{x,y\}$ , we have that

(1) $$ \begin{align} \bigcap_{g\in I}E(g)\cap g^{-1}U_{\sigma(g)}\neq \emptyset. \end{align} $$

Furthermore, since $|I|\geq N_0$ , there exists $s_I,t_I\in I$ such that $s_I\neq t_I$ and

$$ \begin{align*}\mu(s_I^{-1}A\cap t_I^{-1}A)>0.\end{align*} $$

Let $E:G\to 2^X$ be the constant function with

$$ \begin{align*} E(g)=(s_I^{-1}U_x\cap t_I^{-1}U_y)^c. \end{align*} $$

(The fact that it is constant will be important for Theorem 3.8.) Note that $E\in \mathcal {B}^{\prime }_{\mu }(X,\epsilon )$ . Let $\sigma :I\to \{x,y\}$ with $\sigma (s_I)=x$ and $\sigma (t_I)=y$ . Then,

$$ \begin{align*} \bigcap_{g\in I}E(g)\cap g^{-1}U_{\sigma(g)} &\subseteq (E(s_I)\cap s_I^{-1}U_x) \cap (E(t_I)\cap t_I^{-1}U_y)\\ &= (s_I^{-1}U_x\cap t_I^{-1}U_y)^c \cap s_I^{-1}U_x\cap t_I^{-1}U_y\\ &=\emptyset. \end{align*} $$

This is a contradiction to equation (1). Therefore, there exists $(s_A,t_A)\in R_A$ such that $\mu (s_A^{-1}U_x\cap t_A^{-1}U_y)>\epsilon $ .

In [Reference Huang, Lu and Ye14, Theorem 5.9], it was shown that every sequence entropy pair is a $\mu $ -sensitivity pair. In [Reference Li and Tu20, Theorem 1.8], it was shown that sequence entropy pairs are density-sensitivity pairs.

Now we provide a characterization.

Theorem 3.6. Let G be an abelian group, $G\curvearrowright X$ a continuous group action, $\mu $ an ergodic measure, and $(x,y)\in X^2$ with $x\neq y$ . The following are equivalent:

  1. (1) $(x,y)\in X^2$ is a $\mu $ -sequence entropy pair;

  2. (2) $(x,y)\in X^2$ is a $\mu $ -mean sensitivity pair with respect to a tempered Følner sequence;

  3. (3) $(x,y)\in X^2$ is a $\mu $ -mean sensitivity pair with respect to every tempered Følner sequence.

Proof. Given item (2), we obtain item (1) with Proposition 3.3. It only remains to prove that item (1) implies item (3). Let $(x,y)\in X^2$ be a $\mu $ -sequence entropy pair, $U_x$ and $U_y$ neighborhoods of x and y, and $A\in \mathcal {B}_{\mu }^{+}(X)$ . From Theorem 2.13, there exists $\epsilon>0$ such that $(U_x,U_y)$ has $(\epsilon ,\mu )$ -independence over arbitrarily large finite sets. Using Lemma 3.5, there exists $(s,t)\in R_A$ such that

$$ \begin{align*}\mu(s^{-1}U_x\cap t^{-1}U_y)>\epsilon.\end{align*} $$

Let $z\in s^{-1}A\cap t^{-1}A$ be a generic point of $s^{-1}U_x\cap t^{-1}U_y$ , $p=sz$ , and $q=tz$ . Note that $p,q\in A$ . If $gz\in s^{-1}U_x\cap t^{-1}U_y$ , then $gp=gsz\in U_x$ and $gq=gtz\in U_y$ . Therefore, for any tempered Følner sequence, we have that

$$ \begin{align*}\overline{D}(\{g\in G:gp \in U_x\mbox{ and } gq \in U_y\}) =\mu(s^{-1}U_x\cap t^{-1}U_y)\geq \epsilon.\\[-36pt]\end{align*} $$

3.2 Independence

As a consequence of our techniques, we provide a simpler characterization of $\mu $ - $IN$ pairs when $\mu $ is an ergodic measure.

We define $\mathcal {B}_{\mu }(X,\epsilon )=\{D\in \mathcal {B}(X):\mu (D)\geq 1-\varepsilon \}$ .

The following definition is very similar to Kerr and Li’s definition of measure IN-pairs, but we use $\mathcal {B}$ instead of $\mathcal {B}'$ .

Definition 3.7. Let $G\curvearrowright X$ be a continuous group action and $\mu $ an invariant measure. For $A_1,A_2\subseteq X$ and $\epsilon>0$ , we say that $(A_1,A_2)$ has $\mathcal {B}$ - $(\epsilon ,\mu )$ -independence over arbitrarily large finite sets if there exists $c>0$ such that for every $N>0$ , there is a finite set $F\subseteq \ G$ with $|F|>N$ such that for every $D\in \mathcal {B}_{\mu }(X,\epsilon )$ , there is an independence set $I\subseteq F$ for $(U_x,U_y)$ relative to D with $|I|\geq c|F|$ .

We say that $(x,y)$ is a $\mathcal {B}$ - $\mu $ -IN pair if for every neighborhood $U_x$ of x and $U_y$ of y, there exists $\epsilon>0$ such that $(U_x,U_y)$ has $\mathcal {B}$ - $(\epsilon ,\mu )$ -independence over arbitrarily large finite sets.

Theorem 3.8. Let G be an abelian group, $G\curvearrowright X$ a continuous group action, $x\neq y \in X$ , and $\mu $ an ergodic measure. Then $(x,y)$ is an $\mu $ - $IN$ pair if and only if it is a $\mathcal {B}$ - $\mu $ -IN pair.

Proof. One direction is trivial. The other can be obtained by noting that in the proof of Lemma 3.5, we actually only use $\mathcal {B}$ - $\mu $ -IN pairs.

4 Diam-mean sensitivity pairs

Diam-mean sensitivity was introduced in [Reference García-Ramos8] and can be used to characterize when a maximal equicontinuous factor is 1-1 for $\mu $ -almost every point [Reference García-Ramos, Jäger and Ye9]. In this section, we introduce the measure theoretic version of this concept. We provide some basic results which are adaptations from results in [Reference García-Ramos8, Reference Huang, Lu and Ye14]. Nonetheless, this new notion is still somewhat mysterious to the authors since we do not know if it is invariant under isomorphism or not.

Definition 4.1. Let $\{F_n\}$ be a Følner sequence for G, $G\curvearrowright X$ a continuous group action, and $\mu $ an invariant measure. We say that $G\curvearrowright X$ is $\mu $ -diam-mean sensitive if there exists $\epsilon>0$ such that for every $A\in \mathcal {B}_{\mu }^{+}(X)$ , we have that

$$ \begin{align*}\limsup_{n\to\infty} \frac{1}{|F_n|}\sum_{s\in F_n} \mathrm{diam}(sA)>\epsilon.\end{align*} $$

Note that if $G\curvearrowright X$ is $\mu $ -mean sensitive, then it is $\mu $ -diam-mean sensitive.

We do not know if there exists a $\mu $ -diam mean sensitive system with discrete spectrum.

Definition 4.2. Let $\{F_n\}$ be a Følner sequence for G, $G\curvearrowright X$ a continuous group action, and $\mu $ an invariant measure. We say that $(x,y) \in X^2$ is a $\mu $ -diam-mean sensitivity pair if $x\neq y$ and for all open neighborhoods $U_x$ of x and $U_y$ of y, there exists $\epsilon>0$ such that for every $A\in \mathcal {B}_\mu ^+(X)$ , there exists $S\subseteq G$ with $\overline {D}(S)>\epsilon $ such that for every $s\in S$ , there exist $p,q\in A$ such that $sp \in U_x$ and $sq \in U_y$ . We denote the set of $\mu $ -diam-mean sensitivity pairs by $S_\mu ^{dm}(X,G)$ .

Proposition 4.3. Let $G\curvearrowright X$ a continuous group action and $\mu $ an ergodic measure. We have that $G\curvearrowright X$ is $\mu $ -diam-mean sensitive if and only if $S_\mu ^{dm}(X,G)\neq \emptyset $ .

Proof. Suppose that $G\curvearrowright X$ is $\mu $ -diam-mean sensitive with sensitive constant $\epsilon _0>0$ and $\epsilon \in (0,\epsilon _0)$ . We consider the following compact set:

$$ \begin{align*}X^\epsilon=\{(x,y)\in X^2:d(x,y)\geq\epsilon\}.\end{align*} $$

Suppose that $S_\mu ^{dm}(X,G)=\emptyset $ . This implies that for every $(x,y)\in X^\epsilon $ , there exist open neighborhoods of x and y, $U_{x,y}$ and $V_{x,y}$ , such that for every $\delta>0$ , there exists $A_\delta (x,y)\in \mathcal {B}_\mu ^+(X)$ such that

$$ \begin{align*}\overline{D}(\{s\in G:\text{ there exists } p,q\in A_\delta(x,y) \mbox{ such that } sp\in U_{x,y}, sq\in V_{x,y}\})\leq \delta.\end{align*} $$

There exists a finite set $F\subset X^\epsilon $ such that

$$ \begin{align*}X^\epsilon\subseteq \bigcup_{(x,y)\in F} U_{x,y}\times V_{x,y}.\end{align*} $$

Let $\delta =\epsilon /|F|$ and $S(x,y)=\{s\in G:\text { there exists } p,q\in A_\delta (x,y)\mbox { such that }(sp,sq)\in U_{x,y}\times V_{x,y}\}$ forevery $(x,y)\in F$ . Since $\mu $ is ergodic, for every $(x,y)\in F$ , there exists $t(x,y)\in G$ such that $A_0:=\bigcap _{(x,y)\in F} t(x,y)A_\delta (x,y)\in \mathcal {B}_\mu ^+(X)$ . Let $A=\bigcup _{(x,y)\in F} t(x,y)^{-1}A_0$ . Note that $A\in \mathcal {B}_\mu ^+(X)$ , and $A\subseteq A_{\delta }(x,y)$ for every $(x,y)\in F$ . Then

$$ \begin{align*} S:&=\{s\in G:\text{there exists } p,q\in A\mbox{ such that } (sp,sq)\in X^\epsilon\}\\ &\subseteq\bigcup_{(x.y)\in F} \{s\in G:\text{there exists } p,q\in A\mbox{ such that } (sp,sq)\in U_{x,y}\times V_{x,y}\}\\ &\subseteq \bigcup_{(x,y)\in F} S(x,y). \end{align*} $$

Hence, $\overline {D}(S)\leq |F|\delta =\epsilon $ .

However, since $G\curvearrowright X$ is $\mu $ -diam-mean sensitive and $\epsilon $ is smaller than the sensitive constant, we have that $\overline {D}(S)> \epsilon .$ This is a contradiction.

Now we prove the other direction.

Suppose that $S_\mu ^{dm}(X,G)\neq \emptyset $ . Let $(x,y)\in S_\mu ^{dm}(X,G)$ . There exist neighborhoods $U_x$ of x and $U_x$ of y, with $d(U_x,U_y)>0$ , and $\epsilon>0$ , such that for every $A\in \mathcal {B}_\mu ^+(X)$ , there exists $S\subseteq G$ with $\overline {D}(S)>\epsilon $ such that for every $s\in S$ , there exist $p,q\in A$ such that $sp\in U_x$ and $sq\in U_y$ . This implies that $\overline {D}(\{s\in G:\mbox {diam}(sA)>d(U_x,U_y)\})\geq \overline {D}(S)>\epsilon $ . Therefore, $G\curvearrowright X$ is $\mu $ -diam-mean sensitive.

A consequence of Theorem 3.6 is the following corollary.

Corollary 4.4. Let G be an abelian group, $G\curvearrowright X$ a continuous group action, and $\mu $ an ergodic measure. Every $\mu $ -sequence entropy pair is a $\mu $ -diam-mean sensitivity pair.

We do not know if the converse of the previous corollary holds.

Ackowledgements

The first author was supported by the grant U1U/W16/NO/01.03 of the Strategic Excellent Initiative program of Jagiellonian University.

References

Barbieri, S., García-Ramos, F. and Li, H.. Markovian properties of continuous group actions: algebraic actions, entropy and the homoclinic group. Adv. Math. 397 (2022), 108196.10.1016/j.aim.2022.108196CrossRefGoogle Scholar
Blanchard, F.. A disjointness theorem involving topological entropy. Bull. Soc. Math. France 121(4) (1993), 465478.10.24033/bsmf.2216CrossRefGoogle Scholar
Blanchard, F., Host, B., Maass, A., Martinez, S. and Rudolph, D.. Entropy pairs for a measure. Ergod. Th. & Dynam. Sys. 15(4) (1995), 621632.10.1017/S0143385700008579CrossRefGoogle Scholar
Chung, N.-P. and Li, H.. Homoclinic groups, IE groups, and expansive algebraic actions. Invent. Math. 199(3) (2015), 805858.10.1007/s00222-014-0524-1CrossRefGoogle Scholar
Darji, U. B. and García-Ramos, F.. Local entropy theory and descriptive complexity. Preprint, 2023, arXiv:2107.09263.Google Scholar
Darji, U. B. and Kato, H.. Chaos and indecomposability. Adv. Math. 304 (2017), 793808.10.1016/j.aim.2016.09.012CrossRefGoogle Scholar
Fuhrmann, G., Gröger, M. and Lenz, D.. The structure of mean equicontinuous group actions. Israel J. Math. 247(1) (2022), 75123.10.1007/s11856-022-2292-8CrossRefGoogle Scholar
García-Ramos, F.. Weak forms of topological and measure-theoretical equicontinuity: relationships with discrete spectrum and sequence entropy. Ergod. Th. & Dynam. Sys. 37(4) (2017), 12111237.10.1017/etds.2015.83CrossRefGoogle Scholar
García-Ramos, F., Jäger, T. and Ye, X.. Mean equicontinuity, almost automorphy and regularity. Israel J. Math. 243(1) (2021), 155183.10.1007/s11856-021-2157-6CrossRefGoogle Scholar
García-Ramos, F. and Li, H.. Local entropy theory and applications, manuscript in preparation.Google Scholar
García-Ramos, F. and Marcus, B.. Mean sensitive, mean equicontinuous and almost periodic functions for dynamical systems. Discrete Contin. Dyn. Syst. 39(2) (2019), 729746.10.3934/dcds.2019030CrossRefGoogle Scholar
Glasner, E. and Ye, X.. Local entropy theory. Ergod. Th. & Dynam. Sys. 29(2) (2009), 321356.10.1017/S0143385708080309CrossRefGoogle Scholar
Huang, W., Li, J., Thouvenot, J.-P., Xu, L. and Ye, X.. Bounded complexity, mean equicontinuity and discrete spectrum. Ergod. Th. & Dynam. Sys. 41(2) (2021), 494533.10.1017/etds.2019.66CrossRefGoogle Scholar
Huang, W., Lu, P. and Ye, X.. Measure-theoretical sensitivity and equicontinuity. Israel J. Math. 183(1) (2011), 233283.10.1007/s11856-011-0049-xCrossRefGoogle Scholar
Huang, W., Maass, A. and Ye, X.. Sequence entropy pairs and complexity pairs for a measure. Ann. Inst. Fourier (Grenoble) 54(4) (2004), 10051028.10.5802/aif.2041CrossRefGoogle Scholar
Kerr, D. and Li, H.. Independence in topological and C*-dynamics. Math. Ann. 338(4) (2007), 869926.10.1007/s00208-007-0097-zCrossRefGoogle Scholar
Kerr, D. and Li, H.. Combinatorial independence in measurable dynamics. J. Funct. Anal. 256(5) (2009), 13411386.10.1016/j.jfa.2008.12.014CrossRefGoogle Scholar
Kushnirenko, A. G.. On metric invariants of entropy type. Russian Math. Surveys 22(5) (1967), 5361.10.1070/RM1967v022n05ABEH001225CrossRefGoogle Scholar
Li, J., Liu, C., Tu, S. and Yu, T.. Sequence entropy tuples and mean sensitive tuples. Ergod. Th. & Dynam. Sys. doi:10.1017/etds.2023.5. Published online 20 February 2023.CrossRefGoogle Scholar
Li, J. and Tu, S. M.. Density-equicontinuity and density-sensitivity. Acta Math. Sin. (Engl. Ser.) 37(2) (2021), 345361.10.1007/s10114-021-0211-2CrossRefGoogle Scholar
Li, J. and Yu, T.. On mean sensitive tuples. J. Differential Equations 297 (2021), 175200.10.1016/j.jde.2021.06.032CrossRefGoogle Scholar
Lindenstrauss, E.. Pointwise theorems for amenable groups. Invent. Math. 146(2) (2001), 259295.10.1007/s002220100162CrossRefGoogle Scholar
Yu, T., Zhang, G. and Zhang, R.. Discrete spectrum for amenable group actions. Discrete Contin. Dyn. Syst. 41(12) (2021), 58715886.10.3934/dcds.2021099CrossRefGoogle Scholar