Jérôme Buzzi, Sylvain Crovisier, Omri Sarig
Published 2018-11-06Version 1
We show that $C^\infty$ surface diffeomorphisms with positive topological entropy have at most finitely many ergodic measures of maximal entropy in general, and at most one in the topologically transitive case. This answers a question of Newhouse, who proved that such measures always exist. To do this we generalize Smale's spectral decomposition theorem to non-uniformly hyperbolic surface diffeomorphisms, we introduce homoclinic classes of measures, and we study their properties using codings by irreducible countable state Markov shifts.
Weak limits of the measures of maximal entropy for Orthogonal polynomials
Smooth surface systems may contain smooth curves which have no measure of maximal entropy
Rates of mixing for the measure of maximal entropy of dispersing billiard maps
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