Existence of Positive Solutions for Generalized Fractional Br\'ezis-Nirenberg Problem

Abstract

In this article, we study the fractional Br\'ezis-Nirenberg type problem on whole domain RN associated with the fractional p-Laplace operator. To be precise, we want to study the following problem: equation* (-)psu - λ w |u|p-2u= |u|ps*-2u in ~Ds,p(RN), equation* where s∈ (0,1),~p ∈ (1,Ns), ~ps*= NpN-sp and the operator (-)ps is the fractional p-Laplace operator. The space Ds,p(RN) is the completion of Cc∞(RN) with respect to the Gaglairdo semi-norm. In this article, we prove the existence of a positive solution to this problem by allowing the Hardy weight w to change its sign.