A weighted fractional problem involving a singular nonlinearity and a L1 data

Abstract

In this article, we show the existence of a unique entropy solution to the following problem: equation split (-)p,αsu&= f(x)h(u)+g(x) ~in~,\\ u&>0~in~,\\ u&= 0~in~RN, split equation where the domain ⊂ RN is bounded and contains the origin, α∈[0,N-ps2), s∈ (0,1), 2-sN<p<∞, sp<N, g∈ L1(), f∈ Lq() for q>1 and h is a general singular function with singularity at 0. Further, the fractional p-Laplacian with weight α is given by (-)p,αsu(x)=P. V.∫RN|u(x)-u(y)|p-2(u(x)-u(y))|x-y|N+psdy|x|α|y|α,~∀ x∈ RN.