On low-dimensional manifolds with isometric SO0(p,q)-actions

Abstract

Let G be a non-compact simple Lie group with Lie algebra g. Denote with m(g) the dimension of the smallest non-trivial g-module with an invariant non-degenerate symmetric bilinear form. For an irreducible finite volume pseudo-Riemannian analytic manifold M it is observed that (M) ≥ (G) + m(g) when M admits an isometric G-action with a dense orbit. The Main Theorem considers the case G = SO0(p,q) providing an explicit description of M when the bound is achieved. In such case, M is (up to a finite covering) the quotient by a lattice of either SO0(p+1,q) or SO0(p,q+1).