The canonical foliation on null hypersurfaces in low regularity

Abstract

Let H denote the future outgoing null hypersurface emanating from a spacelike 2-sphere S in a vacuum spacetime (M,g). In this paper we study the so-called canonical foliation on H introduced by Klainerman and Nicol\`o and show that the corresponding geometry is controlled locally only in terms of the initial geometry on S and the L2 curvature flux through H. In particular, we show that the ingoing and outgoing null expansions tr and tr are both locally uniformly bounded. The proof of our estimates relies on a generalisation of the methods of Klainerman and Rodnianski, and Alexakis, Shao and Wang where the geodesic foliation on null hypersurfaces H is studied. The results of this paper, while of independent interest, are essential for the proof of the spacelike-characteristic bounded L2 curvature theorem by Czimek and Graf.