Convexity for free boundaries with singular term (nonlinear elliptic case)

Abstract

We consider a free boundary problem in an exterior domain casesarraycc Lu=g(u) & in K, \\ u=1 & on ∂ K,\\ |∇ u|=0 &on ∂ , arraycases where K is a (given) convex and compact set in Rn (n2), =\u>0\⊃ K is an unknown set, and L is either a fully nonlinear or the p-Laplace operator. Under suitable assumptions on K and g, we prove the existence of a nonnegative quasi-concave solution to the above problem. We also consider the cases when the set K is contained in \xn=0\, and obtain similar results.

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