The interplay between partial specification, average shadowing, and Besicovitch completeness
Abstract
Let (X,T) be a compact dynamical system. This article proves that if (X,T) has the partial specification property, then it has the average shadowing property. It is also proven that if (X,T) is surjective and has the partial specification property, then the set of ergodic measures of (X,T) is dense in the space of its invariant measures. An example of a compact dynamical system that is not Besicovitch complete is also given.
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