A Variational Analysis of a Gauged Nonlinear Schr\"odinger Equation

Abstract

This paper is motivated by a gauged Schr\"odinger equation in dimension 2 including the so-called Chern-Simons term. The study of radial stationary states leads to the nonlocal problem: - u(x) + (ω + h2(|x|)|x|2 + ∫|x|+∞ h(s)s u2(s)\, ds ) u(x) = |u(x)|p-1u(x), where h(r)= 12∫0r s u2(s) \, ds. This problem is the Euler-Lagrange equation of a certain energy functional. In this paper the study of the global behavior of such functional is completed. We show that for p∈(1,3), the functional may be bounded from below or not, depending on ω . Quite surprisingly, the threshold value for ω is explicit. From this study we prove existence and non-existence of positive solutions.