Semilinear fractional elliptic equations with gradient nonlinearity involving measures

Abstract

We study the existence of solutions to the fractional elliptic equation (E1) (-)α u+ε g(|∇ u|)= in a bounded regular domain of N (N2), subject to the condition (E2) u=0 in c, where ε=1 or -1, (-)α denotes the fractional Laplacian with α∈(1/2,1), is a Radon measure and g:++ is a continuous function. We prove the existence of weak solutions for problem (E1)-(E2) when g is subcritical. Furthermore, the asymptotic behavior and uniqueness of solutions are described when is Dirac mass, g(s)=sp, p≥ 1 and ε=1.