Geodesic completeness of some Lorentzian simple Lie groups

Abstract

In this paper we investigate geodesic completeness of left-invariant Lorentzian metrics on a simple Lie group G when there exists a left-invariant Killing vector field Z on G. Among other results, it is proved that if Z is timelike, or G is strongly causal and Z is lightlike, then the metric is complete. We then consider the special complex Lie group SL2(C) in more details and show that the existence of a lightlike vector field Z on it, implies geodesic completeness. We also consider the existence of a spacelike vector field Z on SL2(C) and provide an equivalent condition for the metric to be complete. This illustrates the complexity of the situation when Z is spacelike.