Almost Everywhere Regularity for the Free Boundary of the Normalized p-harmonic Obstacle problem p>2
Abstract
Let u be a solution to the normalized p-harmonic obstacle problem with p>2. That is, u∈ W1,p(B1(0)), 2<p<∞, u 0 and ( |∇ u|p-2∇ u)=\u>0\ in B1(0) where u(x) 0 and A is the characteristic function of the set A. Our main result is that for almost every free boundary point, with respect to the (n-1)-Hausdorff measure, there is a neighborhood where the free boundary is a C1,β-graph. That is, for n-1-a.e. point x0∈ ∂ \u>0\ B1(0) there is an r>0 such that Br(x0) ∂ \u>0\∈ C1,β.
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