Fractional Elliptic problem with Finite many critical Hardy--Sobolev Exponents

Abstract

In this paper, we consider the following problem: (-)s u -ζ u|x|2s = Σi=1k |u|2*s,θi-2u |x|θi , ~in~ RN, where N≥slant3, s∈(0,1), ζ∈ [ 0,4s(N+2s4)(N-2s4) ), 2*s,θi=2(N-θi)N-2s are the critical Hardy--Sobolev exponents, the parameters θi satisfy a suitable assumption. By using Morrey space, refinement of Hardy--Sobolev inequality and variational method, we establish the existence of nonnegative solution. Our result generalizes the result obtained by Chen [Electronic J. Differ. Eq. (2018) 1--12].