Least energy radial sign-changing solution for the Schr\"oinger-Poisson system in r3 under an asymptotically cubic nonlinearity

Abstract

In this paper we consider the following Schr\"odinger-Poisson system in the whole R3, equation* \ arrayll - u+u+ λ φ u=f(u) & in R3, - φ= u2 & in R3, array . equation* where λ>0 and the nonlinearity f is "asymptotically cubic" at infinity. This implies that the nonlocal term φ u and the nonlinear term f(u) are, in some sense, in a strict competition. We show that the system admits a least energy sign-changing and radial solution obtained by minimizing the energy functional on the so-called nodal Nehari set).