The effect of topology on the number of positive solutions of elliptic equation involving Hardy-Littlewood-Sobolev critical exponent

Abstract

In this article we are concern for the following Choquard equation \[ - u = λ |u|q-2u +(∫ |u(y)|2*μ|x-y|μ dy )|u|2*μ-2 u \; in\; , u = 0 \; on ∂ , \] where is an open bounded set with continuous boundary in RN( N≥ 3), 2*μ=2N-μN-2 and q ∈ [2,2*) where 2*=2NN-2. Using Lusternik-Schnirelman theory, we associate the number of positive solutions of the above problem with the topology of . Indeed, we prove if λ< λ1 then problem has cat() positive solutions whenever q ∈ [2,2*) and N>3 or 4<q<6 and N=3.