Typical conservative homeomorphisms have total metric mean dimension

Abstract

Given a compact smooth boundaryless manifold with dimension greater than one endowed with a locally positive non-atomic measure μ, we prove that typical μ-preserving homeomorphisms have upper metric mean dimension, with respect to the Riemannian distance, equal to the dimension of the manifold. Moreover, we prove that μ is a measure of maximal metric mean dimension, with respect to the variational principle established in [VV17].

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