Null hypersurfaces and trapping horizons

Abstract

The purpose of the present work is to study (marginally) trapped submanifolds lying in a null hypersurface. Let (M,g,N)(c) be a null hypersurface of a space-time with constant sectional curvature c, endowed with a Screen Integrable and Conformal rigging N. The (Marginally) Trapped Submanifolds we are interested with are particular leaves of the screen distribution according to the sign of their expansions. We prove that if c is non-positive, then cannot contain a null non-expanding horizon. In the case c is positive, we show that if satisfies Einstein's equation and dominant energy condition holds, then any null trapping horizon of is a null non-expanding horizon. More generally we prove that in a spacetime (c) with constant sectional curvature c, cross-sections of a marginally outer trapped tube are Riemann manifold with the same constant sectional curvature c.