On a planar Schr\"odinger-Poisson system involving a non-symmetric potential

Abstract

We prove the existence of a ground state positive solution of Schr\"odinger-Poisson systems in the plane of the form - u + V(x)u + γ2π (|·| u2 )u = b |u|p-2u \ R2, where p>4, γ,b>0 and the potential V is assumed to be positive and unbounded at infinity. On the potential we do not require any symmetry or periodicity assumption, and it is not supposed it has a limit at infinity. We approach the problem by variational methods, using a variant of the mountain pass theorem and the Cerami compactness condition.