High energy solutions for p-Kirchhoff elliptic problems with Hardy-Littlewood-Sobolev nonlinearity

Abstract

This article deals with the study of the following Kirchhoff-Choquard problem: equation* arraycc M(\, ∫RN|∇ u|p) (-p) u + V(x)|u|p-2u = (\, ∫RNF(u)(y)|x-y|μ\,dy ) f(u), \;\;in \; RN, u > 0, \;\; in \; RN, array equation* where M models Kirchhoff-type nonlinear term of the form M(t) = a + btθ-1, where a, b > 0 are given constants; 1<p<N, p = div(|∇ u|p-2∇ u) is the p-Laplacian operator; potential V ∈ C2(RN); f is monotonic function with suitable growth conditions. We obtain the existence of a positive high energy solution for θ ∈ [1, 2N-μN-p) via the Pohozaev manifold and linking theorem. Apart from this, we also studied the radial symmetry of solutions of the associated limit problem.