A variational principle for metric mean dimension via lower Brin-Katok local entropy
Abstract
We prove a finite-scale comparison between lower Brin-Katok local entropy and Katok covering entropy. Let (X,d,T) be a compact metric topological dynamical system and let μ be ergodic. Then, for every ε>0 and every δ∈(0,1), hKμ(6ε,δ)≤ hBKμ(ε). Combining this estimate with the usual Katok-type variational principle for metric mean dimension gives the corresponding variational principle with lower Brin-Katok local entropy.
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