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Scientific Object Identifier: http://s-o-i.org/1.1/TAS-12-128-32
DOI: https://dx.doi.org/10.15863/TAS.2023.12.128.32
Language: Russian
Citation: Tattibekov, K. S. (2023). Multicomponent generalizations of the MA system of equations. ISJ Theoretical & Applied Science, 12 (128), 301-303. Soi: http://s-o-i.org/1.1/TAS-12-128-32 Doi: https://dx.doi.org/10.15863/TAS.2023.12.128.32 |
Pages: 301-303
Published: 30.12.2023
Abstract: Integrable generalizations of the Landau-Lifschitz equations were constructed as ?- models of soliton equations.To construct such a model of equations, the ideas of gauge equivalence are usually used. In this paper, using this methodology, multicomponent generalizations of the system of Maxwell's equations are constructed.
Key words: integrable generalizations, gauge equivalence, sigma models, zero curvature, redefined system, Lax representation, integrals of motion, soliton solutions.
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