Nonlinear nonlocal equations involving subcritical or power nonlinearities and measure data

Abstract

Let s∈(0,1), 1<p<Ns and ⊂RN be an open bounded set. In this work we study the existence of solutions to problems (E) Lu g(u)=μ and u=0 a.e. in RN, where g∈ C(R) is a nondecreasing function, μ is a bounded Radon measure on and L is an integro-differential operator with order of differentiability s∈(0,1) and summability p∈(1,Ns). More precisely, L is a fractional p-Laplace type operator. We establish sufficient conditions for the solvability of problems (E). In the particular case g(t)=|t|-1t; >p-1, these conditions are expressed in terms of Bessel capacities.