Cubic-Quintic Long-Range Interactions With Double Well Potentials

TL;DR

This paper investigates the effects of combined cubic and quintic long-range interactions in a double well potential, revealing novel bifurcation phenomena and providing a reduced dynamical system analysis.

Contribution

It introduces a systematic derivation of coupled cubic-quintic ODEs for long-range interactions in double well systems and analyzes their bifurcation structure and stability.

Findings

Symmetry breaking bifurcation identified for same-type interactions.

Discovery of symmetry restoring bifurcation in mixed interaction cases.

Analysis of bifurcations and stability in both reduced and full models.

Abstract

In the present work, we examine the combined effects of cubic and quintic terms of the long range type in the dynamics of a double well potential. Employing a two-mode approximation, we systematically develop two cubic-quintic ordinary differential equations and assess the contributions of the long-range interactions in each of the relevant prefactors, gauging how to simplify the ensuing dynamical system. Finally, we obtain a reduced canonical description for the conjugate variables of relative population imbalance and relative phase between the two wells and proceed to a dynamical systems analysis of the resulting pair of ordinary differential equations. While in the case of cubic and quintic interactions of the same kind (e.g. both attractive or both repulsive), only a symmetry breaking bifurcation can be identified, a remarkable effect that emerges e.g. in the setting of repulsive cubic but attractive quintic interactions is a "symmetry restoring" bifurcation. Namely, in addition to the supercritical pitchfork that leads to a spontaneous symmetry breaking of the anti-symmetric state, there is a subcritical pitchfork that eventually reunites the asymmetric daughter branch with the anti-symmetric parent one. The relevant bifurcations, the stability of the branches and their dynamical implications are examined both in the reduced (ODE) and in the full (PDE) setting.