Spontaneous symmetry breaking of binary fields in a nonlinear double-well structure

TL;DR

This paper investigates spontaneous symmetry breaking in a two-component nonlinear double-well system, revealing novel behaviors and bifurcations not present in single-component models, with complex evolution scenarios for various mode types.

Contribution

It introduces a two-component model with symmetric nonlinear potentials, analyzing new SSB phenomena, including antisymmetric mode bifurcations and complex solution evolution scenarios.

Findings

SSB of antisymmetric modes occurs only in two-component systems

Existence of S-AS states exclusive to two-component systems

Complex bifurcation scenarios involving multiple mode types

Abstract

We introduce a one-dimensional two-component system with the self-focusing cubic nonlinearity concentrated at a symmetric set of two spots. Effects of the spontaneous symmetry breaking (SSB) of localized modes were previously studied in the single-component version of this system. In this work, we study the evolution (in the configuration space of the system) and SSB scenarios for two-component modes of three generic types, as concerns the spatial symmetry of each component: symmetric-symmetric (Sm-Sm), antisymmetric-antisymmetric (AS-AS), and symmetric-antisymmetric (S-AS) ones. In the limit case of the nonlinear potential represented by two $% \delta $-functions, solutions are obtained in a semi-analytical form. They feature novel properties, in comparison with the previously studied single-component model. In particular, the SSB of antisymmetric modes is possible solely in the two-component system, and, obviously, S-AS states exist only in the two-component system too. In the general case of the symmetric pair of finite-width nonlinear potential wells, evolution scenarios are very complex. In this case, new results are reported, first, for the single-component model. These are pairs of broken-antisymmetry modes, and of twin-peak symmetric ones, which are generated by saddle-mode bifurcations separated from the transformations previously studied in the the single-component setting. With regard to these findings, complex scenarios of the evolution of the two-component solution families are realized in terms of links connecting pairs of modes of three simplest types: (A) two-component ones with unbroken symmetries; (B) single-component modes featuring density peaks in both potential wells; (C) single-component modes which are trapped, essentially, in a single well.