Positivity sets of supersolutions of degenerate elliptic equations and the strong maximum principle
Abstract
We investigate positivity sets of nonnegative supersolutions of the fully nonlinear elliptic equations F(x,u,Du,D2u)=0 in , where is an open subset of RN, and the validity of the strong maximum principle for F(x,u,Du,D2u)=f in , with f∈C() being nonpositive. We obtain geometric characterizations of positivity sets \x∈\,:\, u(x)>0\ of nonnegative supersolutions u and establish the strong maximum principle under some geometric assumption on the set \x∈\,:\, f(x)=0\.
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