Generic uniqueness for the Plateau problem

Abstract

Given a complete Riemannian manifold M⊂Rd which is a Lipschitz neighbourhood retract of dimension m+n, of class Ch,β and an oriented, closed submanifold ⊂ M of dimension m-1, which is a boundary in integral homology, we construct a complete metric space B of Ch,α-perturbations of inside M, with α<β, enjoying the following property. For the typical element b∈ B, in the sense of Baire categories, there exists a unique m-dimensional integral current in M which solves the corresponding Plateau problem and it has multiplicity one.