Volume and non-existence of compact Clifford-Klein forms

Abstract

This article studies the volume of compact quotients of reductive homogeneous spaces. Let G/H be a reductive homogeneous space and a discrete subgroup of G acting properly discontinuously and cocompactly on G/H. We prove that the volume of G/H is the integral, over a certain homology class of , of a G-invariant form on G/K (where K is a maximal compact subgroup of G). As a corollary, we obtain a large class of homogeneous spaces the compact quotients of which have rational volume. For instance, compact quotients of pseudo-Riemannian spaces of constant curvature -1 and odd dimension have rational volume. This contrasts with the Riemannian case. We also derive a new obstruction to the existence of compact Clifford--Klein forms for certain homogeneous spaces. In particular, we obtain that SO(p,q+1)/SO(p,q) does not admit compact quotients when p is odd, and that SL(n,R)/SL(m,R) does not admit compact quotients when m is even.