Localised modes in discrete lattices
Lead Research Organisation:
University of Bristol
Department Name: Engineering Mathematics and Technology
Abstract
Interplay between nonlinearity and periodicity is the focus of recent studies in different branches of modern applied mathematics and nonlinear physics. Our research program is in mathematical analysis of discrete dynamical systems. We aim to study nonlinear models expressed by the differential advanced-delay equations, difference equations and partial differential equations in the context of applications to photonic band-gap engineering, nonlinear optics, and atomic physics of Bose-Einstein condensates. The research program consists of several specific goals (problems): (1) derivation of the discrete nonlinear Schrodinger equation and the coupled-mode (Dirac) system, (2) persistence of traveling waves in discrete lattices, and (3) bifurcations and stability of three-dimensional discrete vortices.
Organisations
People |
ORCID iD |
Alan Champneys (Principal Investigator) |
Publications
D Pelinovsky
(2007)
Discrete travelling solitons in the Salerno model
in SIAM Journal of Applied Dynamical Systems
Pelinovsky D
(2007)
One-parameter localized traveling waves in nonlinear Schrödinger lattices
in Physica D: Nonlinear Phenomena
Description | A new method for understanding exactly when true radiationless waves can travel through nonlinear lattices was developed. This led to further work with Panos Kevrekidis that has been widely influential in studying travelling localised modes in a wide variety of models. |
Exploitation Route | Used by Panos Kevrekidis one of the mostly widely cited scientists in nonlinear science. This has proved influential as a new methodology in nonlinear discrete wave equations. |
Sectors | Digital/Communication/Information Technologies (including Software) |