Bound state nodal solutions for the non-autonomous Schr\"odinger--Poisson system in R3

Abstract

In this paper, we study the existence of nodal solutions for the non-autonomous Schr\"odinger--Poisson system: equation* \ arrayll - u+u+λ K(x) φ u=f(x) |u|p-2u & in R3, \\ - φ =K(x)u2 & in R3,% array% . equation*% where λ >0 is a parameter and 2<p<4. Under some proper assumptions on the nonnegative functions K(x) and f(x), but not requiring any symmetry property, when λ is sufficiently small, we find a bounded nodal solution for the above problem by proposing a new approach, which changes sign exactly once in R3. In particular, the existence of a least energy nodal solution is concerned as well.