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Packing topological entropy for amenable group actions

Dou Dou, Dongmei Zheng, Xiaomin Zhou

2021Ergodic Theory and Dynamical Systems18 citationsDOI

Abstract

Abstract Packing topological entropy is a dynamical analogy of the packing dimension, which can be viewed as a counterpart of Bowen topological entropy. In the present paper we give a systematic study of the packing topological entropy for a continuous G -action dynamical system $(X,G)$ , where X is a compact metric space and G is a countable infinite discrete amenable group. We first prove a variational principle for amenable packing topological entropy: for any Borel subset Z of X , the packing topological entropy of Z equals the supremum of upper local entropy over all Borel probability measures for which the subset Z has full measure. Then we obtain an entropy inequality concerning amenable packing entropy. Finally, we show that the packing topological entropy of the set of generic points for any invariant Borel probability measure $\mu $ coincides with the metric entropy if either $\mu $ is ergodic or the system satisfies a kind of specification property.

Topics & Concepts

MathematicsTopological entropyTopological entropy in physicsAmenable groupProbability measureEntropy (arrow of time)Infimum and supremumEntropy rateCountable setJoint quantum entropyMetric spaceErgodic theoryCombinatoricsTopology (electrical circuits)Pure mathematicsDiscrete mathematicsPrinciple of maximum entropyTopological quantum numberStatisticsPhysicsQuantum mechanicsMathematical Dynamics and FractalsChromatography in Natural ProductsChaos control and synchronization
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