On the Fractional p-laplacian equations with weight and general datum

Abstract

The aim of this paper is to treat the following problem (P) \ arrayrcll (-)sp, β u &= & f(x,u) & in , u & = & 0 & in RN, array . where (-)sp,β\, u(x):=P.V. ∫RN|u(x)-u(y)|p-2(u(x)-u(y))|x-y|N+ps dy|x|β|y|β, is a bounded domain containing the origin, 0 β<N-ps2 , 1<p<N, s∈ (0,1) with ps<N. The main result of this paper is to prove the existence of a weak solution under additional hypotheses on f. In particular, we will consider two cases: 1- f(x,s)=f(x), in this case we prove the existence of a weak solution, that is in a suitable weighted fractional Sobolev spaces, for all f∈ L1(). In addition, if f 0, we show that problem (P) has a unique entropy positive solution. 2-f(x,s)=λ sq +g(x) , in this case, according to the values of λ and q, we get the largest class of data g for which problem (P) has a positive solution. In the case where f 0, then the solution u satisfies a suitable weak Harnack inequality.