On the uniqueness of continuous spacetime extensions in 1+1 dimensions with applications to weak null singularities

Abstract

Motivated by weak null singularities in black hole interiors, we study 1+1 dimensional Lorentzian manifolds (M,g) which admit a continuous spacetime extension across a null boundary v=0, where v<0 is a null coordinate. We study the degree to which such extensions are unique up to the boundary. Firstly, we find that in general not even the C0-structure of the extension is uniquely determined by the assumption that the metric extends continuously. However, we exhibit an interesting local-global relation regarding the C0-structure which in particular entails its rigidity for ''strongly spherically symmetric'' continuous extensions across the Cauchy horizon of the Reissner-Nordström spacetime. Secondly, we construct continuous extensions which have the same C0-structure, but do not have equivalent C1-structures. This construction also carries over to weak null singularities in 3+1 dimensions. Understanding the uniqueness properties of continuous spacetime extensions to the boundary is of importance for the study of low-regularity inextendibility problems.