The localised bounded L2-curvature theorem

Abstract

In this paper, we prove a localised version of the bounded L2-curvature theorem of Klainerman-Rodnianski-Szeftel. More precisely, we consider initial data for the Einstein vacuum equations posed on a compact spacelike hypersurface with boundary, and show that the time of existence of a classical solution depends only on an L2-bound on the Ricci curvature, an L4-bound on the second fundamental form of ∂ ⊂ , an H1-bound on the second fundamental form, and a lower bound on the volume radius at scale 1 of . Our localisation is achieved by first proving a localised bounded L2-curvature theorem for small data posed on B(0,1), and then using the scaling of the Einstein equations and a low regularity covering argument on to reduce from large data on to small data on B(0,1). The proof uses the author's previous work, and the bounded L2-curvature theorem as black boxes.