On the continuity of topological entropy of certain partially hyperbolic diffeomorphisms

TL;DR

This paper studies the continuity of topological entropy in certain partially hyperbolic diffeomorphisms with arbitrary-dimensional centers, focusing on systems with subexponential growth and exponential mixing properties.

Contribution

It establishes the continuity of topological entropy under $C^1$ perturbations for a broad class of partially hyperbolic systems with subexponential center growth.

Findings

Continuity of topological entropy under $C^1$ perturbations.

Applicability to systems with Lyapunov stability in the center.

Development of techniques using exponential mixing for distribution of unstable manifolds.

Abstract

In this paper, we consider certain partially hyperbolic diffeomorphisms with center of arbitrary dimension and obtain continuity properties of the topological entropy under $C^1$ perturbations. The systems considered have subexponential growth in the center direction and uniform exponential growth along the unstable foliation. Our result applies to partially hyperbolic diffeomorphisms which are Lyapunov stable in the center direction. It applies to another important class of systems which do have subexponential growth in the center direction, for which we develop a technique to use exponential mixing property of the systems to get uniform distribution of unstable manifolds. A primary example is the translations on homogenous spaces which may have center of arbitrary dimension and of polynomial orbit growth.