Singular semilinear elliptic equations in nondivergence form

Abstract

We study the singular semilinear equation -Pu = fuγ on a bounded domain with Dirichlet condition u 0 on ∂ , where P is a second-order elliptic differential operator in nondivergence form. We obtain the existence of a solution under the assumptions that ∈ C1,1 and P has C1 coefficients, as well as the uniqueness of solutions in L1(), under the assumptions that ∈ C2 and P has C2 coefficients. Our proofs are based on a novel combination of tools, such as recently obtained nonlinear variants of Gagliardo--Nirenberg inequalities, estimates of Green functions, and new variants of Kato-type inequalities.