Pointwise perturbations of countable Markov maps

Abstract

We study the pointwise perturbations of countable Markov maps with infinitely many inverse branches and establish the following continuity theorem: Let Tk and T be expanding countable Markov maps such that the inverse branches of Tk converge pointwise to the inverse branches of T as k ∞. Then under suitable regularity assumptions on the maps Tk and T the following limit exists: k ∞ H \x : θk'(x) ≠ 0\ = 1, where θk is the topological conjugacy between Tk and T and H stands for the Hausdorff dimension. This is in contrast with the fact that other natural quantities measuring the singularity of θk fail to be continuous in this manner under pointwise convergence such as the H\"older exponent of θk or the Hausdorff dimension H (μ θk) for the preimage of the absolutely continuous invariant measure μ for T. As an application we obtain a perturbation theorem in non-uniformly hyperbolic dynamics for conjugacies between intermittent Manneville-Pomeau maps x x + x1+α 1 when varying the parameter α.