The new observations about the parameter-dependent Schr\"odinger-Poisson system

Abstract

In this paper, we study the existence results of solutions for the following Schr\"odinger-Poisson system involving different potentials: equation* cases - u+V(x)u-λ φ u=f(u)&~ R3, -φ=u2&~ R3. cases equation* We first consider the case that the potential V is positive and radial so that the mountain pass theorem could be implied. The other case is that the potential V is coercive and sign-changing, which means that the Schr\"odinger operator - +V is allowed to be indefinite. To deal with this more difficult case, by a local linking argument and Morse theory, the system has a nontrivial solution. Furthermore, we also show the asymptotical behavior result of this solution. Additionally, the proofs rely on new observations regarding the solutions of the Poisson equation. As a main novelty with respect to corresponding results in MR4527586,MR3148130,MR2810583, we only assume that f satisfies the super-linear growth condition at the origin. We believe that the methodology developed here can be adapted to study related problems concerning the existence of solutions for Schr\"odinger-Poisson system.