Free Boundary Regularity for Almost-Minimizers

Abstract

In this paper we study the free boundary regularity for almost-minimizers of the functional equation* J(u)=∫ O |∇ u(x)|2 +q2+(x)\u>0\(x) +q2-(x)\u<0\(x)\ dx equation* where q ∈ L∞( O). Almost-minimizers satisfy a variational inequality but not a PDE or a monotonicity formula the way minimizers do (see [AC], [ACF], [CJK], [W]). Nevertheless we succeed in proving that, under a non-degeneracy assumption on q, the free boundary is uniformly rectifiable. Furthermore, when q- 0, and q+ is H\"older continuous we show that the free boundary is almost-everywhere given as the graph of a C1,α function (thus extending the results of [AC] to almost-minimizers).