The concept of quasi-integrability

TL;DR

This paper introduces the concept of quasi-integrability in certain deformed field theories, demonstrating that they exhibit some integrable features despite not being fully integrable, through analytical and numerical methods.

Contribution

It defines quasi-integrability using a deformed sine-Gordon model and adapts integrability techniques to identify asymptotically conserved charges.

Findings

Asymptotically conserved charges are observed in soliton scattering simulations.

The zero-curvature and abelianisation methods are successfully adapted to the deformed model.

Quasi-integrability features emerge despite the model's non-integrability.

Abstract

We show that certain field theory models, although non-integrable according to the usual definition of integrability, share some of the features of integrable theories for certain configurations. Here we discuss our attempt to define a "quasi-integrable theory", through a concrete example: a deformation of the (integrable) sine-Gordon potential. The techniques used to describe and define this concept are both analytical and numerical. The zero-curvature representation and the abelianisation procedure commonly used in integrable field theories are adapted to this new case and we show that they produce asymptotically conserved charges that can then be observed in the simulations of scattering of solitons.