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

Abstract

Denote by U(p,q) the universal covering group of U(p,q), the linear group of isometries of the pseudo-Hermitian space Cp,q of signature p,q. Let M be a connected analytic complete pseudo-Riemannian manifold that admits an isometric U(p,q)-action and that satisfies M ≤ n(n+2) where n = p+q. We prove that if the action of SU(p,q) (the connected derived group of U(p,q)) has a dense orbit and the center of U(p,q) acts non-trivially, then M is an isometric quotient of manifolds involving simple Lie groups with bi-invariant metrics. Furthermore, the U(p,q)-action is lifted to M to natural actions on the groups involved. As a particular case, we prove that when M is not a pseudo-Riemannian product, then its geometry and U(p,q)-action are obtained from one of the symmetric pairs (su(p,q+1), u(p,q)) or (su(p+1,q), u(p,q)).