The spacetime Penrose inequality under a quasi final state hypothesis

TL;DR

This paper proves the spacetime Penrose inequality under a weaker late-time decay condition called the quasi final state hypothesis, using a new spacetime-based approach involving tangentially maximal hypersurfaces.

Contribution

It introduces the quasi final state hypothesis and a novel spacetime formulation to establish the Penrose inequality without relying on the full black hole final state conjecture.

Findings

Proves the spacetime Penrose inequality under the quasi final state hypothesis.

Develops a new PDE-based approach using tangentially maximal hypersurfaces.

Shows the Hawking mass reduces to the Riemannian Hawking mass on these hypersurfaces.

Abstract

Penrose's original heuristic for his eponymous spacetime inequality -- a conjectured lower bound on the ADM mass in terms of the area of a horizon cross-section -- relies on the black hole final state conjecture. In this paper we isolate a substantially weaker but precise late-time condition, which we call the quasi final state hypothesis and prove the spacetime Penrose inequality under this hypothesis. More precisely, for an asymptotically flat globally hyperbolic spacetime with a black-hole-type apparent horizon tube ${H}_{{app}}$ satisfying the dominant energy condition and the quasi final state hypothesis, we show that every asymptotically flat initial data set whose boundary is a MOTS cross-section of ${H}_{{app}}$ satisfies the spacetime Penrose inequality. The quasi final state hypothesis requires only a late-time decay condition on the normal component of the shift and the ratio of timelike to spacelike mean curvature, together with convergence of the cross-sectional areas of ${H}_{{app}}$ to a finite limit. Our approach is new and formulated directly in spacetime. The main geometric object is what we call a \emph{tangentially maximal} hypersurface, carrying a foliation by spacelike spheres whose timelike mean curvature vanishes. We show that these hypersurfaces are governed by a quasilinear inward-parabolic PDE, and we develop the corresponding a priori theory and prove global existence. On these hypersurfaces, the spacetime Hawking mass reduces to the Riemannian Hawking mass, and the dominant energy condition gives nonnegative scalar curvature. The Riemannian Penrose inequality, combined with the area laws for dynamical and isolated horizons, then yields the result.