Rate distortion theory, metric mean dimension and measure theoretic entropy

Abstract

We prove a variational principle for the metric mean dimension analog to the one in [LT]. Instead of using the rate distortion function we use the function hμ(ε,T,δ) that is closely related to the entropy hμ(T) of μ. Our formulation has the advantage of being, in the authors opinion, more natural when doing computations. As a corollary we obtain a proof of the standard variational principle. We also obtain some relations between the rate distortion function with our function hμ(ε,T,δ), a modification of hμ(ε,T,δ) when replacing the dynamical metrics with the average dynamical metrics. Using our methods we also reprove the main result in [LT]. We will explain how to construct homeomorphisms on closed manifolds with maximal metric mean dimension. We end this paper with some questions that naturally arise from this work.