Infinitely many sign-changing solutions for Kirchhoff type problems in R3

Abstract

In this paper, we consider the following nonlinear Kirchhoff type problem: \[ \arraylcl-(a+b∫R3|∇ u|2) u+V(x)u=f(u), & in\,\,R3,\\ u∈ H1(R3), array. \] where a,b>0 are constants, the nonlinearity f is superlinear at infinity with subcritical growth and V is continuous and coercive. For the case when f is odd in u we obtain infinitely many sign-changing solutions for the above problem by using a combination of invariant sets method and the Ljusternik-Schnirelman type minimax method. To the best of our knowledge, there are only few existence results for this problem. It is worth mentioning that the nonlinear term may not be 4-superlinear at infinity, in particular, it includes the power-type nonlinearity |u|p-2u with p∈(2,4].