Density of the level sets of the metric mean dimension for homeomorphisms

Abstract

Let N be an n-dimensional compact riemannian manifold, with n≥ 2. In this paper, we prove that for any α∈ [0,n], the set consisting of homeomorphisms on N with lower and upper metric mean dimensions equal to α is dense in Hom(N). More generally, given α,β∈ [0,n], with α≤ β, we show the set consisting of homeomorphisms on N with lower metric mean dimension equal to α and upper metric mean dimension equal to β is dense in Hom(N). Furthermore, we also give a proof that the set of homeomorphisms with upper metric mean dimension equal to n is residual in Hom(N).

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