C∞ regularity in semilinear free boundary problems

Abstract

We study the higher regularity of solutions and free boundaries in the Alt-Phillips problem u=uγ-1, with γ∈(0,1). Our main results imply that, once free boundaries are C1,α, then they are C∞. In addition u/d22-γ and u2-γ2 are C∞ too. In order to achieve this, we need to establish fine regularity estimates for solutions of linear equations with boundary-singular Hardy potentials - v = v/d2 in , where d is the distance to the boundary and ≤14. Interestingly, we need to include even the critical constant =14, which corresponds to γ=23.

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