De Sole, A., Jibladze, M., Kac, V. G. and Valeri, D. (2021) Integrable triples in semisimple Lie algebras. Letters in Mathematical Physics, 111(1), 117. (doi: 10.1007/s11005-021-01456-4)
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Abstract
We classify all integrable triples in simple Lie algebras, up to equivalence. The importance of this problem stems from the fact that for each such equivalence class one can construct the corresponding integrable hierarchy of bi-Hamiltonian PDE. The simplest integrable triple (f,0,e) in sl2 corresponds to the KdV hierarchy, and the triple (f,0,eθ), where f is the sum of negative simple root vectors and eθ is the highest root vector of a simple Lie algebra, corresponds to the Drinfeld-Sokolov hierarchy.
| Item Type: | Articles |
|---|---|
| Status: | Published |
| Refereed: | Yes |
| Glasgow Author(s) Enlighten ID: | Valeri, Dr Daniele |
| Authors: | De Sole, A., Jibladze, M., Kac, V. G., and Valeri, D. |
| College/School: | College of Science and Engineering > School of Mathematics and Statistics > Mathematics |
| Journal Name: | Letters in Mathematical Physics |
| Publisher: | Springer |
| ISSN: | 0377-9017 |
| ISSN (Online): | 1573-0530 |
| Copyright Holders: | Copyright © 2021 The Authors |
| First Published: | First published in Letters in Mathematical Physics 111(1):117 |
| Publisher Policy: | Reproduced under a Creative Commons licence |
| Related URLs: |
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