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The generalized centrally extended Lie algebraic structures and related integrable heavenly type equations

Hentosh, O. Ye., Balinsky, A. A. and Prykarpatski, A. K. 2020. The generalized centrally extended Lie algebraic structures and related integrable heavenly type equations. Carpathian Mathematical Publications 12 (1) , pp. 242-265. 10.15330/cmp.12.1.242-264

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Abstract

There are studied Lie-algebraic structures of a wide class of heavenly type non-linear integrable equations, related with coadjoint flows on the adjoint space to a loop vector field Lie algebra on the torus. These flows are generated by the loop Lie algebras of vector fields on a torus and their coadjoint orbits and give rise to the compatible Lax-Sato type vector field relationships. The related infinite hierarchy of conservations laws is analysed and its analytical structure, connected with the Casimir invariants, is discussed. We present the typical examples of such equations and demonstrate in details their integrability within the scheme developed. As examples, we found and described new multidimensional generalizations of the Mikhalev-Pavlov and Alonso-Shabat type integrable dispersionless equation, whose seed elements possess a special factorized structure, allowing to extend them to the multidimensional case of arbitrary dimension.

Item Type: Article
Date Type: Publication
Status: Published
Schools: Mathematics
ISSN: 2313-0210
Date of First Compliant Deposit: 20 July 2020
Date of Acceptance: 22 May 2020
Last Modified: 21 Jul 2020 09:15
URI: http://orca.cf.ac.uk/id/eprint/133611

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