Complete Classification and Nondegeneracy of N-Component Cubic Nonlinear Schrödinger System in R

Abstract

We study the one-dimensional cubic nonlinear Schrödinger system \[ ui''+2(Σk=1N uk2)ui=-μi ui in \ R,\ \ i=1,2,·s,N, \] where u=(u1,·s,uN)∈ (H1(R))N, μ1≤μ2≤·s≤μN<0, and N≥ 2 is arbitrary. In this paper, we prove the following results for any N 2: (i). All nontrivial solutions of the system can be completely classified; (ii). The linearized operator at any nontrivial solution of the system is non-degenerate; (iii). For all i=1, 2,·s, N, the exact L2-mass identity of ui is derived in terms of 2 |μi|, which yields a complete characterization of normalized solutions satisfying ∫Rui2dx=1. These settle some conjectures of [R. Frank, D. Gontier and M. Lewin, CMP, 2021] and [Y. Guo, Y. Luo and J. Wei, APDE, 2026], where the system was addressed specially for N=2 and N=3, respectively.