Mean sensitive, mean equicontinuous and almost periodic functions for dynamical systems
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We show that a continuous abelian action (in particular ℝd) on a compact metric space equipped with an invariant ergodic measure has discrete spectrum if and only it is μ - mean equicontinuous (proven for ℤd in [14]). In order to do this we introduce mean equicontinuity and mean sensitivity with respect to a function. We study this notion in the topological and measure theoretic setting. In the measure theoretic case we characterize almost periodic functions with these concepts and in the topological case we show that weakly almost periodic functions are mean equicontinuous (the converse does not hold). We compare our results with some results in the theory of Delone dynamical systems and quasicrystals. © 2019 American Institute of Mathematical Sciences. All rights reserved.
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Almost periodic functions; Discrete spectrum; Mean equicontinuity; Mean sensitivity; Quasicrystals
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