Epsilon-regularity for the solutions of a free boundary system

Abstract

This paper is dedicated to a free boundary system arising in the study of a class of shape optimization problems. The problem involves three variables: two functions u and v, and a domain ; with u and v being both positive in , vanishing simultaneously on ∂ and satisfying an overdetermined boundary value problem involving the product of their normal derivatives on ∂. Precisely, we consider solutions u, v ∈ C(B1) of - u= f - v=g =\u>0\=\v>0\\ , ∂ u∂ n∂ v∂ n=Q ∂ B1. Our main result is an epsilon-regularity theorem for viscosity solutions of this free boundary system. We prove a partial Harnack inequality near flat points for the couple of auxiliary functions uv and 12(u+v). Then, we use the gained space near the free boundary to transfer the improved flatness to the original solutions. Finally, using the partial Harnack inequality, we obtain an improvement-of-flatness result, which allows to conclude that flatness implies C1,α regularity.