Ergodic Properties of Invariant Measures for C1+α nonuniformly hyperbolic systems

Abstract

For an ergodic hyperbolic measure ω of a C1+α diffeomorphism, there is an ω full-measured set such that every nonempty, compact and connected subset V of Minv() coincides with the accumulating set of time averages of Dirac measures supported at one orbit, where Minv() denotes the space of invariant measures supported on . Such state points corresponding to a fixed V are dense in the support supp(ω). Moreover, Minv() can be accumulated by time averages of Dirac measures supported at one orbit, and such state points form a residual subset of supp(ω). These extend results of Sigmund [9] from uniformly hyperbolic case to non-uniformly hyperbolic case. As a corollary, irregular points form a residual set of supp(ω).