Dimension approximation in smooth dynamical systems

Abstract

For a non-conformal repeller of a C1+α map f preserving an ergodic measure μ of positive entropy, this paper shows that the Lyapunov dimension of μ can be approximated gradually by the Carath\'eodory singular dimension of a sequence of horseshoes. For a C1+α diffeomorphism f preserving a hyperbolic ergodic measure μ of positive entropy, if (f, μ) has only two Lyapunov exponents λu(μ)>0>λs(μ), then the Hausdorff or lower box or upper box dimension of μ can be approximated by the corresponding dimension of the horseshoes \n\. The same statement holds true if f is a C1 diffeomorphism with a dominated Oseledet's splitting with respect to μ.