A new discrete monotonicity formula with application to a two-phase free boundary problem in dimension two

Abstract

We continue the analysis of the two-phase free boundary problems initiated in DK, where we studied the linear growth of minimizers in a Bernoulli type free boundary problem at the non-flat points and the related regularity of free boundary. There, we also defined the functional φp(r,u,x0)=1r4∫Br(x0)|∇ u+(x)|p|x-x0|N-2dx∫Br(x0)|∇ u-(x)|p|x-x0|N-2dx where x0 is a free boundary point, i.e. x0∈∂\u>0\ and u is a minimizer of the functional J(u):=∫|∇ u|p +λ+p\,\u>0\ +λ-p\,\u 0\, for some bounded smooth domain ⊂ RN and positive constants λ with :=λ+p-λp->0. Here we show the discrete monotonicity of φp(r,u,x0) in two spatial dimensions at non-flat points, when p is sufficiently close to 2, and then establish the linear growth. A new feature of our approach is the anisotropic scaling argument discussed in Section 4.