Some applications of lp-cohomology to boundaries of Gromov hyperbolic spaces

Abstract

We study quasi-isometry invariants of Gromov hyperbolic spaces, focussing on the lp-cohomology and closely related invariants such as the conformal dimension, combinatorial modulus, and the Combinatorial Loewner Property. We give new constructions of continuous lp-cohomology, thereby obtaining information about the lp-equivalence relation, as well as critical exponents associated with lp-cohomology. As an application, we provide a flexible construction of hyperbolic groups which do not have the Combinatorial Loewner Property, extending and complementing earlier examples. Another consequence is the existence of hyperbolic groups with Sierpinski carpet boundary which have conformal dimension arbitrarily close to 1. In particular, we answer questions of Mario Bonk and John Mackay.