Twisted Patterson-Sullivan measures and applications to amenability and coverings

Abstract

Let '< be two discrete groups acting properly by isometries on a Gromov-hyperbolic space X. We prove that their critical exponents coincide if and only if ' is co-amenable in , under the assumption that the action of on X is strongly positively recurrent, i.e. has a growth gap at infinity. This generalizes all previously known results on this question, which required either X to be the real hyperbolic space and geometrically finite, or X Gromov hyperbolic and cocompact. This result is optimal: we provide several counterexamples when the action is not strongly positively recurrent.