Measure-theoretic equicontinuity and rigidity
Abstract
Let (X,T) be a topological dynamical system and μ be a invariant measure, we show that (X,B,μ,T) is rigid if and only if there exists some subsequence A of N such that (X,T) is μ-A-equicontinuous if and only if there exists some IP-set A such that (X,T) is μ-A-equicontinuous. We show that if there exists a subsequence A of N with positive upper density such that (X,T) is μ-A-mean-equicontinuous, then (X,B,μ,T) is rigid. We also give results with respect to functions.
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