Dirichlet domains for Anosov subgroups

Abstract

We introduce a sufficient condition for a finitely generated subgroup of a semisimple Lie group G to admit finite-sided Dirichlet domains for polyhedral Finsler metrics on the symmetric space G/K. The condition always implies the -Anosov condition for some , and can be arranged to be equivalent to the -Anosov condition when G is simple and is the set of long roots or the set of short roots. The Dirichlet domain we obtain extends to a fundamental domain for the action of on a domain of discontinuity in a flag manifold. For instance, Borel Anosov subgroups of SL(d,R) have finite-sided Dirichlet domains for the Hilbert metric on the symmetric space which extends to the space of line-hyperplane flags, and n-Anosov subgroups of Sp(2n,R) have finite-sided Dirichlet-Selberg domains in SL(2n,R)/SO(2n) which extend to a domain in projective space bounded by quadrics.