Ali Tahzibi: Let $f: \mathbb{T}^3 \rightarrow \mathbb{T}^3$ be an Anosov diffeomorphism with $E^{uu} \oplus E^u \oplus E^s$ decomposition. Let $\mu$ be an invariant probability measure such that $h_{\mu}(f, \mathcal{F}^{uu}) = h_{top}(f, \mathcal{F}^{uu}).$ Is it true that $\mu$ is m.m.e?
open-problems.txt · Last modified: 2021/04/26 21:27 by tahzibi
Discussion
Ali Tahzibi: Let $f: \mathbb{T}^3 \rightarrow \mathbb{T}^3$ be an Anosov diffeomorphism with $E^{uu} \oplus E^u \oplus E^s$ decomposition. Let $\mu$ be an invariant probability measure such that $h_{\mu}(f, \mathcal{F}^{uu}) = h_{top}(f, \mathcal{F}^{uu}).$ Is it true that $\mu$ is m.m.e?