Quasi-Shadowing and Quasi-Stability for Dynamically Coherent Partially Hyperbolic Diffeomorphisms

Abstract

Let f be a partially hyperbolic diffeomorphism. f is called has the quasi-shadowing property if for any pseudo orbit \xk\k∈ Z, there is a sequence \yk\k∈ Z tracing it in which yk+1 lies in the local center leaf of f(yk) for any k∈ Z. f is called topologically quasi-stable if for any homeomorphism g C0-close to f, there exist a continuous map π and a motion τ along the center foliation such that π g=τ fπ. In this paper we prove that if f is dynamically coherent then it has quasi-shadowing and topological quasi-stability properties.