Hausdorff Dimension of non-conical and Myrberg limit sets

Abstract

In this paper, we develop techniques to study the Hausdorff dimensions of non-conical and Myrberg limit sets for groups acting on negatively curved spaces. We establish maximality of the Hausdorff dimension of the non-conical limit set of G in the following cases. 1. M is a finite volume complete Riemannian manifold of pinched negative curvature and G is an infinite normal subgroups of infinite index in π1(M). 2. G acts on a regular tree X with X/G infinite and amenable (dimension 1). 3. G acts on the hyperbolic plane H2 such that H2/G has Cheeger constant zero (dimension 2). 4. G is a finitely generated geometrically infinite Kleinian group (dimension 3). We also show that the Hausdorff dimension of the Myrberg limit set is the same as the critical exponent, confirming a conjecture of Falk-Matsuzaki.