The Hawking-Penrose singularity theorem for C1,1-Lorentzian metrics

Abstract

We show that the Hawking--Penrose singularity theorem, and the generalisation of this theorem due to Galloway and Senovilla, continue to hold for Lorentzian metrics that are of C1, 1-regularity. We formulate appropriate weak versions of the strong energy condition and genericity condition for C1,1-metrics, and of C0-trapped submanifolds. By regularisation, we show that, under these weak conditions, causal geodesics necessarily become non-maximising. This requires a detailed analysis of the matrix Riccati equation for the approximating metrics, which may be of independent interest.