Polyhedral bounds on the joint spectrum and temperedness of locally symmetric spaces

Abstract

Given a real semisimple connected Lie group G and a discrete subgroup < G we prove a precise connection between growth rates of the group , polyhedral bounds on the joint spectrum of the ring of invariant differential operators, and the decay of matrix coefficients. In particular, this allows us to completely characterize temperedness of L2( G) in terms of Quint's growth indicator function. As an application of our sharp polyhedral bounds we prove temperedness of L2( G) for all Borel Anosov subgroups in higher rank Lie groups G not locally isomorphic to sl3(K),K=,, H, or e6(-26).