Abstract
We are interested in the stochastic property of some "Anosov-like" system. In this paper we will treat a transitive and partially hyperbolic diffeomorphism f of a 2-dimensional torus with uniformly contracting direction, and show that if f is of C2 and admits an SRB measure, then f is an Anosov diffeomorphism. In our proof we use the Pujals-Sambarino theorem for C2 diffeomorphisms with dominated splitting. In the case of C1+α the above statement is not true in general, i.e. we can construct a C1+α counter example of Maneville-Pomeau type.
Citation
Jin Hatomoto. "Diffeomorphisms admitting SRB measures and their regularity." Kodai Math. J. 29 (2) 211 - 226, June 2006. https://doi.org/10.2996/kmj/1151936436
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