Perturbative symmetry approach for differential-difference equations
We propose a new method to tackle the integrability problem for evolutionary differential–difference equations of arbitrary order. It enables us to produce necessary integrability conditions, to determine whether a given equation is integrable or not, and to advance in classification of integrable equations. We define and develop symbolic representation for the difference polynomial ring, difference operators and formal series. In order to formulate necessary integrability conditions, we introduce a novel quasi-local extension of the difference ring. We apply the developed formalism to solve the classification problem of integrable equations for anti-symmetric quasi-linear equations of order (−3,3) and produce a list of 17 equations satisfying the necessary integrability conditions. For every equation from the list we present an infinite family of integrable higher order relatives. Some of the equations obtained are new.
Funding
A novel approach to integrability of semi-discrete systems
Engineering and Physical Sciences Research Council
Find out more...Exact solutions for discrete and continuous nonlinear systems
Engineering and Physical Sciences Research Council
Find out more...Exact solutions for discrete and continuous nonlinear systems
Engineering and Physical Sciences Research Council
Find out more...History
School
- Science
Department
- Mathematical Sciences
Published in
Communications in Mathematical PhysicsVolume
393Issue
2Pages
1063 - 1104Publisher
Springer (part of Springer Nature)Version
- VoR (Version of Record)
Rights holder
© The AuthorsPublisher statement
This is an Open Access Article. It is published by Springer under the Creative Commons Attribution 4.0 International Licence (CC BY). Full details of this licence are available at: https://creativecommons.org/licenses/by/4.0/Acceptance date
2022-03-17Publication date
2022-05-03Copyright date
2022ISSN
0010-3616eISSN
1432-0916Publisher version
Language
- en