On denseness of horospheres in higher rank homogeneous spaces

Abstract

Let G be a connected, semisimple real algebraic group and < G be a Zariski dense discrete subgroup. Let N denote a maximal horospherical subgroup of G, and P=MAN the minimal parabolic subgroup which is the normalizer of N. Let E denote the unique P-minimal subset of G and let E0 be a P-minimal subset. We consider a notion of a horospherical limit point in the Furstenberg boundary G/P and show that the following are equivalent for any [g]∈ E0: (1) gP∈ G/P is a horospherical limit point; (2) [g]NM is dense in E; (3) [g]N is dense in E0. The equivalence of (1) and (2) is due to Dal'bo in the rank one case. We also observe that unlike convex cocompact groups of rank one Lie groups, the NM-minimality of E does not hold in a general Anosov homogeneous space.