Concentration of positive ground state solutions for critical Kirchhoff equation with competing potentials

Abstract

In this paper, we consider the following singularly perturbed Kirchhoff equation equation* -(2a+ b∫R3|∇ u|2dx) u+V(x)u=P(x)|u|p-2u+Q(x)|u|4u, x∈R3, equation* where >0 is a small parameter, a, b > 0 are constants, p∈(4,6) and V, P, Q are potential functions satisfying some competing conditions. We prove the existence of a positive ground state solution by using variational methods, and we determine a concrete set related to the potentials V,P and Q as the concentration position of these ground state solutions as 0.