Ergodic properties of invariant measures for systems with average shadowing property

Abstract

In this paper, we explore a topological system f:M→ M with average shadowing property. We extend Sigmund's results and show that every non-empty, compact and connected subset V⊂eq Minv(f) coincides with Vf(y), where Minv(f) denotes the space of invariant Borel probability measures on M, and Vf(y) denotes the accumulation set of time average of Dirac measures supported at the orbit of y. We also show that the set MV=\y∈ M\,\,|\,\,Vf(y)=V\ is dense in V=∈ Vsupp(). In particular, if max=∈ Minv(f)supp() is isolated or coincides with M, then Mmax=\y: Vf(y)= Minv(f)\ is residual in max.