Kirchhoff equations with Hardy-Littlewood-Sobolev critical nonlinearity

Abstract

We consider the following Kirchhoff - Choquard equation \[ -M(\| u\|L22) u = f(x)|u|q-2u+ (∫|u(y)|2*μ|x-y|μdy)|u|2*μ-2u \; in\; , u = 0 \; on , \] where is a bounded domain in RN( N≥ 3) with C2 boundary, 2*μ=2N-μN-2, 1<q≤ 2, and f is a continuous real valued sign changing function. When 1<q< 2, using the method of Nehari manifold and Concentration-compactness Lemma, we prove the existence and multiplicity of positive solutions of the above problem. We also prove the existence of a positive solution when q=2 using the Mountain Pass Lemma.