Some sufficient conditions for transitivity of Anosov diffeomorphisms
Abstract
Given a C2- Anosov diffemorphism f: M → M, we prove that the jacobian condition Jfn(p) = 1, for every point p such that fn(p) = p, implies transitivity. As application in the celebrated theory of Sinai-Ruelle-Bowen, this result allows us to state a classical theorem of Livsic-Sinai without directly assuming transitivity as a general hypothesis. A special consequence of our result is that every C2-Anosov diffeomorphism, for which every point is regular, is indeed transitive.
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