A perturbation approach for the Schr\"odinger-Born-Infeld system: solutions in the subcritical and critical case

Abstract

In this paper, we study the following Schr\"odinger-Born-infeld system with a general nonlinearity \ arrayll - u+u+φ u=f(u)+μ|u|4u\,\,&in\,\,3,\\ -div(∇φ1-|∇φ|2)=u2&in\,\,3,\\ u(x)→0,\,\,φ(x)→0,&\,as\,\,x→∞, array . where μ≥0 and f∈ C(,) satisfies suitable assumptions. This system arises from a suitable coupling of the nonlinear Schr\"odinger equation and the Born-Infeld theory. We use a new perturbation approach to prove the existence and multiplicity of nontrivial solutions of the above system in the subcritical and critical case. We emphasise that our results cover the case f(u)=|u|p-1u for p∈(2,5/2] and μ=0 which was left in Azzollini19 as an open problem.