Accessability of typical points for invariant measures of positive Lyapunov exponents for iterations of holomorphic maps
Abstract
We prove that if A is the basin of immediate attraction to a periodic attracting or parabolic point for a rational map f on the Riemann sphere, if A is completely invariant (i.e. f-1(A)=A), and if μ is an arbitrary f-invariant measure with positive Lyapunov exponents on the boundary of A, then μ-almost every point q in the boundary of A is accessible along a curve from A. In fact we prove the accessability of every "good" q i.e. such q for which "small neighbourhoods arrive at large scale" under iteration of f. This generalizes Douady-Eremenko-Levin-Petersen theorem on the accessability of periodic sources.
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