Plateau's problem via the Allen--Cahn functional

Abstract

Let be a compact codimension-two submanifold of Rn, and let L be a nontrivial real line bundle over X = Rn . We study the Allen--Cahn functional, \[E(u) = ∫X |∇ u|22 + (1-|u|2)24\,dx,\] on the space of sections u of L. Specifically, we are interested in critical sections for this functional and their relation to minimal hypersurfaces with boundary equal to . We first show that, for a family of critical sections with uniformly bounded energy, in the limit as 0, the associated family of energy measures converges to an integer rectifiable (n-1)-varifold V. Moreover, V is stationary with respect to any variation which leaves fixed. Away from , this follows from work of Hutchinson--Tonegawa; our result extends their interior theory up to the boundary . Under additional hypotheses, we can say more about V. When V arises as a limit of critical sections with uniformly bounded Morse index, := supp \|V\| is a minimal hypersurface, smooth away from and a singular set of Hausdorff dimension at most n-8. If the sections are globally energy minimizing and n = 3, then is a smooth surface with boundary, ∂ = (at least if L is chosen correctly), and has least area among all surfaces with these properties. We thus obtain a new proof (originally suggested in a paper of Fr\"ohlich and Struwe) that the smooth version of Plateau's problem admits a solution for every boundary curve in R3. This also works if 4 ≤ n≤ 7 and is assumed to lie in a strictly convex hypersurface.