Davi Obata
Published 2020-02-29Version 1
In this paper we prove that for sufficiently large parameters the standard map has a unique measure of maximal entropy (m.m.e.). Moreover, we prove: the m.m.e. is Bernoulli, and the periodic points with Lyapunov exponents bounded away from zero equidistribute with respect to the m.m.e. We prove some estimates regarding the Hausdorff dimension of the m.m.e. and about the density of the support of the measure on the manifold. For a generic large parameter, we prove that the support of the m.m.e. has Hausdorff dimension $2$. We also obtain the $C^2$-robustness of several of these properties.
Amount of failure of upper-semicontinuity of entropy in noncompact rank one situations, and Hausdorff dimension
Geometric renormalisation and Hausdorff dimension for loop-approximable geodesics escaping to infinity
Hausdorff dimension of boundaries of self-affine tiles in R^n
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