Scale competition in nonlinear Schrodinger models

Yuri B. Gaididei; Peter L. Christiansen; Serge F. Mingaleev

arXiv:cond-mat/9906024·cond-mat.soft·May 23, 2007

Scale competition in nonlinear Schrodinger models

Yuri B. Gaididei, Peter L. Christiansen, Serge F. Mingaleev

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TL;DR

This paper investigates how multiple length scales in nonlinear Schrödinger models lead to new localized states and multistability, enabling controlled switching between stable configurations.

Contribution

It introduces a universal mechanism of length-scale competition in nonlinear Schrödinger models that results in novel localized states and multistability.

Findings

01

Emergence of new localized stationary states due to length-scale competition

02

Multistability allows controlled switching between stable states

03

Universal applicability across three types of models

Abstract

Three types of nonlinear Schrodinger models with multiple length scales are considered. It is shown that the length-scale competition universally results into arising of new localized stationary states. Multistability phenomena with a controlled switching between stable states become possible.

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Taxonomy

TopicsNonlinear Dynamics and Pattern Formation · Quantum chaos and dynamical systems · Quantum Mechanics and Applications