Quasi-Stability of Partially Hyperbolic Diffeomorphisms

Abstract

A partially hyperbolic diffeomorphism f is structurally quasi-stable if for any diffeomorphism g C1-close to f, there is a homeomorphism π of M such that π g and fπ differ only by a motion τ along center directions. f is topologically quasi-stable if for any homeomorphism g C0-close to f, the above holds for a continuous map π instead of a homeomorphism. We show that any partially hyperbolic diffeomorphism f is topologically quasi-stable, and if f has C1 center foliation Wcf, then f is structurally quasi-stable. As applications we obtain continuity of topological entropy for certain partially hyperbolic diffeomorphisms with one or two dimensional center foliation.