Partial Plateau's Problem with $H$-mass
Abstract
Classically, Plateau's problem asks to find a surface of the least area with a given boundary . In this article, we investigate a version of Plateau's problem, where the boundary of an admissible surface is only required to partially span . Our boundary data is given by a flat -chain and a smooth compactly supported differential -form . We are interested in minimizing over all -dimensional rectifiable currents in such that is a subcurrent of the given boundary . The existence of a rectifiable minimizer is proven with Federer and Fleming's compactness theorem. We generalize this problem by replacing the mass with the -mass of rectifiable currents. By minimizing over a larger class of objects, called scans with boundary, and by defining their -mass as a type of lower-semicontinuous envelope over the -mass of rectifiable currents, we prove an existence result for this problem by using Hardt and De Pauw's BV compactness theorem.
Cite
@article{arxiv.2305.05730,
title = {Partial Plateau's Problem with $H$-mass},
author = {Enrique Alvarado and Qinglan Xia},
journal= {arXiv preprint arXiv:2305.05730},
year = {2023}
}
Comments
22 pages, 5 figures