New type of solutions for the nonlinear Schr\"odinger-Newton system

Abstract

The nonlinear Schr\"odinger-Newton system equation* cases u- V(|x|)u + u=0, &~x∈R3,\\ +12 u2=0, &~x∈R3, cases equation* is a nonlinear system obtained by coupling the linear Schr\"odinger equation of quantum mechanics with the gravitation law of Newtonian mechanics. Wei and Yan in (Calc. Var. Partial Differential Equations 37 (2010),423--439) proved that the Schr\"odinger equation has infinitely many positive solutions in RN and these solutions have polygonal symmetry in the (y1, y2) plane and they are radially symmetric in the other variables. Duan et al. in (arXiv:2006.16125v1) extended the results got by Wei and Yan and these solutions have polygonal symmetry in the (y1, y2) plane and they are even in y2with one more more parameter in the expression of the solutions.Hu et al. Under the appropriate assumption on the potential function V, Hu et al. in (arXiv: 2106.04288v1) constructed infinitely many non-radial positive solutions for the Schr\"odinger-Newton system and these positive solutions have polygonal symmetry in the (y1, y2) plane and they are even in y2 and y3. Assuming that V(r) has the following character equation* V(r)=V1+brq+O(1rq+σ),~ as r→∞, equation* Where 12≤ q<1 and b, V1, σ are some positive constants, V(y)≥ V1>0, we construct infinitely many non-radial positive solutions which have polygonal symmetry in the (y1, y2) plane and are even in y2 for the Schr\"odinger-Newton system by the Lyapunov-Schmidt reduction method. We extend the results got by Duan et al. in (arXiv:2006.16125v1) to the nonlinear Schr\"odinger-Newton system.