Two-phase almost minimizers for a fractional free boundary problem

Abstract

In this paper, we study almost minimizers to a fractional Alt-Caffarelli-Friedman type functional. Our main results concern the optimal C0,s regularity of almost minimizers as well as the structure of the free boundary. We first prove that the two free boundaries F+(u)=∂\u(·,0)>0\ and F-(u)=∂\u(·,0)<0\ cannot touch, that is, F+(u) F-(u)=. Lastly, we prove a flatness implies C1,γ result for the free boundary.