Hurwitz-Radon numbers and proper actions of semisimple Lie groups

Abstract

We study proper isometric actions of non-compact semisimple Lie groups on pseudo-Riemannian symmetric spaces. Motivated by Okuda's classification of semisimple symmetric spaces admitting proper SL(2,R)-actions [J. Differential Geom., 2013], we focus on symmetric spaces lying on the boundary of the existence of proper SL(2,R)-actions. As a rigidity result, we show that any connected non-compact semisimple Lie group acting properly on these symmetric spaces must be globally isomorphic to Spin(n,1) up to compact factors. Moreover, the Hurwitz-Radon number arises as the largest value of n for the existence of Spin(n,1)-proper actions. Our symmetric spaces include the pseudo-Riemannian hyperbolic space H+N,N-1 of signature (N,N-1).