A general class of free boundary problems for fully nonlinear elliptic equations
Abstract
In this paper we study the fully nonlinear free boundary problem arrayll F(D2u)=1 & a.e. inB1 |D2 u| ≤ K & a.e. inB1, array. where K>0, and is an unknown open set. Our main result is the optimal regularity for solutions to this problem: namely, we prove that W2,n solutions are locally C1,1 inside B1. Under the extra condition that ⊃ \D u≠ 0 \, and a uniform thickness assumption on the coincidence set \D u = 0 \, we also show local regularity for the free boundary ∂ B1.
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