Robust entropy expansiveness implies generic domination
Abstract
Let f: M M be a Cr-diffeomorphism, r≥ 1, defined on a compact boundaryless d-dimensional manifold M, d≥ 2, and let H(p) be the homoclinic class associated to the hyperbolic periodic point p. We prove that if there exists a C1 neighborhood U of f such that for every g∈ U the continuation H(pg) of H(p) is entropy-expansive then there is a Df-invariant dominated splitting for H(p) of the form E F1... Fc G where E is contracting, G is expanding and all Fj are one dimensional and not hyperbolic.
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