The minimizing problem involving p--Laplacian and Hardy--Littlewood--Sobolev upper critical exponent

Abstract

In this paper, we study the minimizing problem: Sp,1,α,μ:= ∈fu∈ W1,p(RN)\0\ ∫RN|∇ u|pdx - μ ∫RN |u|p|x|p dx ( ∫RN ∫RN |u(x)|p*α|u(y)|p*α|x-y|α dx dy )p2· p*α, where N≥slant3, p∈(1,N), μ∈ [ 0, ( N-pp )p ), α∈(0,N) and p*α= p2(2N-αN-p) is the Hardy--Littlewood--Sobolev upper critical exponent. Firstly, by using refinement of Hardy-Littlewood-Sobolev inequality, we prove that Sp,1,α,μ is achieved in RN by a radially symmetric, nonincreasing and nonnegative function. Secondly, we give a estimation of extremal function.