On the singular planar Plateau problem

Abstract

Given any =γ(S1)⊂R2, image of a Lipschitz curve γ:S1→ R2, not necessarily injective, we provide an explicit formula for computing the value of \[ A(γ):=∈f\. ∫B1(0)|det(∇ u)| d x \ | \ u=γ on S1\, \] where the infimum is evaluated among all Lipschitz maps u:B1(0)→ R2 having boundary datum γ. This coincides with the area of a minimal disk spanning , i.e., a solution of the Plateau problem of disk type for the oriented contour . The novelty of the results relies in the fact that we do not assume the curve γ to be injective and our formula allows for any kind of self-intersections