Existence and symmetry of solutions to 2-D Schr\"odinger-Newton equations

Abstract

In this paper, we consider the following 2-D Schr\"odinger-Newton equations eqnarray* - u+a(x)u+γ2π((|·|)*|u|p)|u|p-2u=b|u|q-2u in \,\,\, R2, eqnarray* where a∈ C(R2) is a Z2-periodic function with ∈fR2a>0, γ>0, b≥0, p≥2 and q≥ 2. By using ideas from CW,DW,Stubbe, under mild assumptions, we obtain existence of ground state solutions and mountain pass solutions to the above equations for p≥2 and q≥2p-2 via variational methods. The auxiliary functional J1 plays a key role in the cases p≥3. We also prove the radial symmetry of positive solutions (up to translations) for p≥2 and q≥ 2. The corresponding results for planar Schr\"odinger-Poisson systems will also be obtained. Our theorems extend the results in CW,DW from p=2 and b=1 to general p≥2 and b≥0.