Elliptic equations involving general subcritical source nonlinearity and measures

Abstract

In this article, we study the existence of positive solutions to elliptic equation (E1) (-)α u=g(u)+σ in , subject to the condition (E2) u=μ on ∂\ \ if\ α=1 or\ \ in\ \ c \ \ if\ α∈(0,1), where σ,0, is an open bounded C2 domain in RN, (-)α denotes the fractional Laplacian with α∈(0,1) or Laplacian operator if α=1, ,μ are suitable Radon measures and g:R++ is a continuous function. We introduce an approach to obtain weak solutions for problem (E1)-(E2) when g is integral subcritical and σ,0 small enough.