The fibering method approach for a non-linear Schr\"odinger equation coupled with the electromagnetic field

Abstract

We study, with respect to the parameter q≠0, the following Schr\"odinger-Bopp-Podolsky system in R3 equation* \ aligned -& u+ω u+q2φ u=|u|p-2u, \\ &- φ+a22 φ = 4π u2, aligned . equation* where p∈(2,3], ω>0, a≥0 are fixed. We prove, by means of the fibering approach, that the system has no solutions at all for large values of q's, and has two radial solutions for small q's. We give also qualitative properties about the energy level of the solutions and a variational characterization of these extremals values of q. Our results recover and improve some results in the literature.