The quasilinear Schr\"odinger--Poisson system

Abstract

This paper deals with the (p,q)--Schr\"odinger--Poisson system eqnarray* \arrayll -p u+|u|p-2u+λφ |u|s-2u=|u|r-2u,&in \ R3,\\ -q φ = |u|s, &in\ R3,\\ array . eqnarray* where 1<p<3, \1,3p5p-3\<q<3, p<r<p*:=3p3-p, \1,(q*-1)pq*\<s<(q*-1)p*q*, i u=div(|∇ u|i-2∇ u)\ (i=p,q) and λ>0 is a parameter. This quasilinear system is new and has never been considered in the literature. The uniqueness of solutions of the quasilinear Poisson equation is obtained via the Minty--Browder theorem. The variational framework of the quasilinear system is built and the nontrivial solutions of the system are obtained via the mountain pass theorem.

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