Calculus of Variations and Geometric Measure Theory

F. Cavalletti - D. Manini - A. Mondino

Optimal transport on null hypersurfaces and the null energy condition

created by mondino on 21 Aug 2024

[BibTeX]

preprint

Inserted: 21 aug 2024
Last Updated: 21 aug 2024

Year: 2024

ArXiv: 2408.08986 PDF

Abstract:

The goal of the present work is to study optimal transport on null hypersurfaces inside Lorentzian manifolds. The challenge here is that optimal transport along a null hypersurface is completely degenerate, as the cost takes only the two values $0$ and $+\infty$. The tools developed in the manuscript enable to give an optimal transport characterization of the null energy condition (namely, non-negative Ricci curvature in the null directions) for Lorentzian manifolds in terms of convexity properties of the Boltzmann--Shannon entropy along null-geodesics of probability measures. We obtain as applications: a stability result under convergence of spacetimes, a comparison result for null-cones, and the Hawking area theorem (both in sharp form, for possibly weighted measures, and with apparently new rigidity statements).


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