Dominated Splitting and Pesin's Entropy Formula

Abstract

Let M be a compact manifold and f:\,M M be a C1 diffeomorphism on M. If μ is an f-invariant probability measure which is absolutely continuous relative to Lebesgue measure and for μ a.\,\,e.\,\,x∈ M, there is a dominated splitting Torb(x)M=E F on its orbit orb(x), then we give an estimation through Lyapunov characteristic exponents from below in Pesin's entropy formula, i.e., the metric entropy hμ(f) satisfies hμ(f)≥∫ (x)dμ, where (x)=Σi=1dim\,F(x)λi(x) and λ1(x)≥λ2(x)≥...≥λdim\,M(x) are the Lyapunov exponents at x with respect to μ. Consequently, by using a dichotomy for generic volume-preserving diffeomorphism we show that Pesin's entropy formula holds for generic volume-preserving diffeomorphisms, which generalizes a result of Tahzibi in dimension 2.