Absolutely Continuous Invariant measures for non-autonomous dynamical systems

Abstract

We consider the non autonomous dynamical system \τn\, where τn is a continuous map X→ X, and X is a compact metric space. We assume that \τn\ converges uniformly to τ . The inheritance of chaotic properties as well as topological entropy by τ from the sequence \τn\ has been studied in Can1, Can2, Li,Ste,Zhu. In You the generalization of SRB\ measures to non-autonomous systems has been considered. In this paper we study absolutely continuous invariant measures (acim) for non autonomous systems. After generalizing the Krylov-Bogoliubov Theorem KB and Straube's Theorem Str to the non autonomous setting, we prove that under certain conditions the limit map τ of a non autonomous sequence of maps \τn\ with acims has an acim.