A nonlocal free boundary problem

Abstract

Given~s,σ∈(0,1) and a bounded domain~⊂n, we consider the following minimization problem of s-Dirichlet plus σ-perimeter type [u] Hs(2n(c)2) + σ(\u>0\,), where~[ ·]Hs is the fractional Gagliardo seminorm and σ is the fractional perimeter. Among other results, we prove a monotonicity formula for the minimizers, glueing lemmata, uniform energy bounds, convergence results, a regularity theory for the planar cones and a trivialization result for the flat case. Several classical free boundary problems are limit cases of the one that we consider in this paper, as s1, σ1 or~σ0.