Abstract
Multi-component integrable generalizations of the Fokas-Lenells equation, associated with each irreducible Hermitian symmetric space are formulated. Description of the underlying structures associated to the integrability, such as the Lax representation and the bi-Hamiltonian formulation of the equations is provided. Two reductions are considered as well, one of which leads to a nonlocal integrable model. Examples with Hermitian symmetric spaces of all classical series of types A.III, BD.I, C.I and D.III are presented in details, as well as possibilities for further reductions in a general form.
| Original language | English |
|---|---|
| Pages (from-to) | 939-963 |
| Number of pages | 25 |
| Journal | Nonlinearity |
| Volume | 34 |
| Issue number | 2 |
| DOIs | |
| Publication status | Published - Feb 2021 |
Keywords
- A.III symmetric space
- BD.I symmetric space
- C.I and D.III symmetric spaces
- bi-Hamiltonian integrable systems
- derivative nonlinear Schrodinger equation
- nonlocal integrable equations
- simple Lie algebra