Invariant measures for horospherical actions and Anosov groups

Abstract

Let be a Zariski dense Anosov subgroup of a connected semisimple real algebraic group G. For a maximal horospherical subgroup N of G, we show that the space of all non-trivial NM-invariant ergodic and A-quasi-invariant Radon measures on G, up to proportionality, is homeomorphic to Rrank\,G-1, where A is a maximal real split torus and M is a maximal compact subgroup which normalizes N. One of the main ingredients is to establish the NM-ergodicity of all Burger-Roblin measures.