English

On the singular planar Plateau problem

Analysis of PDEs 2024-02-27 v2

Abstract

Given any Γ=γ(S1)R2\Gamma=\gamma(\mathbb{S}^1)\subset\mathbb{R}^2, image of a Lipschitz curve γ:S1R2\gamma:\mathbb{S}^1\rightarrow \mathbb{R}^2, not necessarily injective, we provide an explicit formula for computing the value of A(γ):=inf{B1(0)det(u)dx  u=γ on S1}, \mathcal A(\gamma):=\inf\left\{\left. \int_{B_1(0)}|\mathrm{det}(\nabla u)| \mathrm{d} x \ \right| \ u=\gamma \text{ on }\mathbb{S}^1\right\}, where the infimum is evaluated among all Lipschitz maps u:B1(0)R2u:B_1(0)\rightarrow \mathbb{R}^2 having boundary datum γ\gamma. This coincides with the area of a minimal disk spanning Γ\Gamma, i.e., a solution of the Plateau problem of disk type for the oriented contour Γ\Gamma. The novelty of the results relies in the fact that we do not assume the curve γ\gamma to be injective and our formula allows for any kind of self-intersections

Cite

@article{arxiv.2402.13050,
  title  = {On the singular planar Plateau problem},
  author = {Marco Caroccia and Riccardo Scala},
  journal= {arXiv preprint arXiv:2402.13050},
  year   = {2024}
}
R2 v1 2026-06-28T14:54:33.926Z