On the completeness of impulsive gravitational wave space-times

Abstract

We consider a class of impulsive gravitational wave space-times, which generalize impulsive pp-waves. They are of the form M=N×R21, where (N,h) is a Riemannian manifold of arbitrary dimension and M carries the line element ds2=dh2+ 2dudv+f(x)δ(u)du2 with dh2 the line element of N and δ the Dirac measure. We prove a completeness result for such space-times M with complete Riemannian part N.