On completeness of certain locally symmetric pseudo-Riemannian manifolds of signature (2,2)

Abstract

We show geodesic completeness of certain compact locally symmetric pseudo-Riemannian manifolds of signature (2,n). Our model space X is a 1-connected, indecomposable symmetric space of signature (2,n), that admits a unique (up to scale) parallel lightlike vector field. This class of spaces is the natural generalization of the class of Cahen--Wallach spaces to signature (2,n). In dimension 4 we show that X has no proper domain which is divisible by the action of a discrete group of Isom(X), i.e. acts properly and cocompactly on . Therefore, we deduce geodesic completeness in the aforementioned situation. In arbitrary dimension we show geodesic completeness of compact locally symmetric space modeled on X under the assumption that the transition maps of M are restrictions of transvections of X. Along the way, we establish a new case in the Kleinian 3-dimensional Markus's conjecture for flat affine manifolds. Moreover, we classify geometrically Kleinian compact manifolds that are modeled on the hyperbolic oscillator group endowed with its bi-invariant metric. Finally we discuss a natural dynamical problem motivated by the Lorentz setting (Brinkmann spacetimes). Specifically, we show that the parallel flow on M is equicontinuous in dimension 4, even in our non-Lorentz setting.