A cohomological obstruction to the existence of compact Clifford-Klein forms

Abstract

In this paper, we continue the study of the existence problem of compact Clifford-Klein forms from a cohomological point of view, which was initiated by Kobayashi-Ono and extended by Benoist-Labourie and the author. We give an obstruction to the existence of compact Clifford-Klein forms by relating a natural homomorphism from relative Lie algebra cohomology to de Rham cohomology with an upper-bound estimate for cohomological dimensions of discontinuous groups. From this obstruction, we derive some examples, e.g. SO0(p+r, q)/(SO0(p,q) × SO(r)) (p,q,r ≥ 1, \ q:odd) and SL(p+q, C)/SU(p,q) (p,q ≥ 1), of a homogeneous space that does not admit a compact Clifford-Klein form. To construct these examples, we apply H. Cartan's theorem on relative Lie algebra cohomology of reductive pairs and the theory of ε-families of semisimple symmetric pairs.