Existence and Soap Film Regularity of Solutions to Plateau's Problem

Abstract

Plateau's soap film problem is to find a surface of least area spanning a given boundary. We begin with a compact orientable (n-2)-dimensional submanifold M of n. If M is connected, we say a compact set X "spans" M if X intersects every Jordan curve whose linking number with M is 1. Picture a soap film that spans a loop of wire. Using (n-1)-dimensional Hausdorff spherical measure as the measure of the size of a compact set X in n, we prove there exists a smallest compact set X0 that spans M. We also show that X0 is almost everywhere a real analytic (n-1)-dimensional minimal submanifold and if n = 3, then X0 has the structure of a soap film as predicted by Plateau. We provide more details about the minimizer X0. Primarily, X0 is the support of a current S0 and M is the support of the algebraic boundary of S0. We also discuss the more general case where M has codimension > 2.