Some existence and nonexistence results for a Schr\"odinger-Poisson type system

Abstract

In this paper, we study the Schr\"odinger-Poisson system \ arrayl - u=pup-1v, u>0 in Rn, - v=pup, v>0 in Rn array . with n ≥ 3 and p>1. We investigate the existence and the nonexistence of positive classical solutions with the help of an integral system involving the Newton potential \ arrayl u(x)=c1∫Rnup-1(y)v(y)dy|x-y|n-2, u>0 in Rn, v(x)=c2∫Rnup(y)dy|x-y|n-2 v>0 in Rn. array . First, the system has no solution when p≤ nn-2. When p>nn-2, the system has a singular solution on Rn \0\ with slow asymptotic rate 2p-1. When p<n+2n-2, the system has no solution in Ln(p-1)2(Rn). In fact, if the system has solutions in Ln(p-1)2(Rn), then p=n+2n-2 and all the positive classical solutions can be classified as u(x)=v(x)=c(tt2+|x-x*|2)n-22, where c,t are positive constants. When p>n+2n-2, by the shooting method and the Pohozaev identity, we find another pair of radial solution (u,v) satisfying u v and decaying with slow rate 2p-1.