Shadowing and mixing on systems of countable group actions

Abstract

Let (X,G,) be a dynamical system, where X is compact Hausdorff space, and G is a countable discrete group. We investigate shadowing property and mixing between subshifts and general dynamical systems. For the shadowing property, fix some finite subset S⊂ G. We prove that if X is totally disconnected, then has S-shadowing property if and only if (X,G,) is conjugate to an inverse limit of a sequence of shifts of finite type which satisfies Mittag-Leffler condition. Also, suppose that X is metric space (may be not totally disconnected), we prove that if has S-shadowing property, then (X,G,) is a factor of an inverse limit of a sequence of shifts of finite type by a factor map which almost lifts pseudo-orbit for S. On the other hand, let property P be one of the following property: transitivity, minimal, totally transitivity, weakly mixing, mixing, and specification property. We prove that if X is totally disconnected, then has property P if and only if (X,G,) is conjugate to an inverse limit of an inverse system that consists of subshifts with property P which satisfies Mittag-Leffler condition. Also, for the case of metric space (may be not totally disconnected), if property P is not minimal or specification property, we prove that has property P if and only if (X,G,) is a factor of an inverse limit of a sequence of subshifts with property P which satisfies Mittag-Leffler condition.