Prescribing the mean curvature of an achronal hypersurface as a measure: the case of 3D spacetimes
Articolo
Data di Pubblicazione:
2025
Citazione:
Prescribing the mean curvature of an achronal hypersurface as a measure: the case of 3D spacetimes / L. Maniscalco, L. Mari. - (2025 Dec 19).
Abstract:
We study the existence problem for achronal hypersurfaces M ,→ M in a
globally hyperbolic spacetime, whose mean curvature is a prescribed – possibly singular
– source, and whose boundary is a given smooth spacelike submanifold. Since M is
allowed to go null somewhere, the mean curvature prescription is to be understood
in the distributional sense. We prove a general existence and regularity theorem
for surfaces in ambient dimension 3. Although most of our estimates hold in any
dimension, recent counterexamples show that some of our conclusions fail in ambient
dimension at least 5. The case of 4D-spacetimes is an open problem. Our theorems
have application to Born-Infeld electrostatics in general static spacetimes.
globally hyperbolic spacetime, whose mean curvature is a prescribed – possibly singular
– source, and whose boundary is a given smooth spacelike submanifold. Since M is
allowed to go null somewhere, the mean curvature prescription is to be understood
in the distributional sense. We prove a general existence and regularity theorem
for surfaces in ambient dimension 3. Although most of our estimates hold in any
dimension, recent counterexamples show that some of our conclusions fail in ambient
dimension at least 5. The case of 4D-spacetimes is an open problem. Our theorems
have application to Born-Infeld electrostatics in general static spacetimes.
Tipologia IRIS:
23 - Pubblicazione su portale
Keywords:
Mathematics - Differential Geometry; Mathematics - Differential Geometry; Mathematical Physics; Lorentzian mean curvature; Born-Infeld model; light segment, singularity; maximal hypersurface
Elenco autori:
L. Maniscalco, L. Mari
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