Measures of maximal entropy for surface diffeomorphisms
Jérôme Buzzi, Sylvain Crovisier, Omri Sarig
Abstract
We show that $C^\infty$-surface diffeomorphisms with positive topological entropy have finitely many ergodic measures of maximal entropy in general, and exactly 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.
Topics & Concepts
Surface (topology)MathematicsEntropy (arrow of time)GeometryPhysicsThermodynamicsMathematical Dynamics and FractalsCellular Automata and ApplicationsGeometric and Algebraic Topology