A hierarchy of Plateau problems and the approximation of Plateau's laws via the Allen--Cahn equation

TL;DR

This paper introduces a diffused interface approach to the Plateau problem using the Allen--Cahn energy, analyzing its limits to connect with classical formulations and addressing singularities and Plateau's laws.

Contribution

It develops a new Allen--Cahn based formulation for the Plateau problem and proves convergence to classical solutions, resolving incompatibilities with Plateau's laws.

Findings

Convergence of Allen--Cahn solutions to Gauss' capillarity formulation as epsilon approaches zero.

Convergence to the classical Plateau problem under specific limits of epsilon and volume.

Approximation of Plateau-type singularities by energy minimizing Allen--Cahn solutions.

Abstract

We introduce a diffused interface formulation of the Plateau problem, where the Allen--Cahn energy $\mathcal{AC}_\varepsilon$ is minimized under a volume constraint $v$ and a spanning condition on the level sets of the densities. We discuss two singular limits of these Allen--Cahn Plateau problems: when $\varepsilon\to 0^+$, we prove convergence to the Gauss' capillarity formulation of the Plateau problem with positive volume $v$; and when $\varepsilon\to 0^+$, $v\to 0^+$ and $\varepsilon/v\to 0^+$, we prove convergence to the classical Plateau problem (in the homotopic spanning formulation of Harrison and Pugh). As a corollary of our analysis we resolve the incompatibility between Plateau's laws and the Allen--Cahn equation implied by a regularity theorem of Tonegawa and Wickramasekera. In particular, we show that Plateau-type singularities can be approximated by energy minimizing solutions of the Allen--Cahn equation with a volume Lagrange multiplier and a transmission condition on a spanning free boundary.