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Symmetry, Integrability and Geometry: Methods and Applications, 2017, Volume 13, 031, 14 pp.
DOI: https://doi.org/10.3842/SIGMA.2017.031 (Mi sigma1231) 		 
This article is cited in 3 scientific papers (total in 3 papers)

Zamolodchikov Tetrahedral Equation and Higher Hamiltonians of $2d$ Quantum Integrable Systems

Dmitry V. Talalaev

Geometry and Topology Department, Faculty of Mechanics and Mathematics, Moscow State University, Moscow, 119991 Russia
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DOI: https://doi.org/10.3842/SIGMA.2017.031
Abstract: The main aim of this work is to develop a method of constructing higher Hamiltonians of quantum integrable systems associated with the solution of the Zamolodchikov tetrahedral equation. As opposed to the result of V. V. Bazhanov and S. M. Sergeev the approach presented here is effective for generic solutions of the tetrahedral equation without spectral parameter. In a sense, this result is a two-dimensional generalization of the method by J.-M. Maillet. The work is a part of the project relating the tetrahedral equation with the quasi-invariants of 2-knots.
Keywords: Zamolodchikov tetrahedral equation; quantum integrable systems; star-triangle transformation.
Funding agency Grant number
Russian Foundation for Basic Research 17-01-00366_a
Ministry of Education and Science of the Russian Federation 4833.2014.1
Dynasty Foundation
The work was partially supported by the RFBR grant of Russian Foundation of Basic Research 17-01-00366A, grant of the support of scientific schools 4833.2014.1, and the grant of the Dynasty Foundation.
Received: January 17, 2017; in final form May 13, 2017; Published online May 22, 2017
Bibliographic databases:
Document Type: Article
MSC: 16T25
Language: English
Citation: Dmitry V. Talalaev, “Zamolodchikov Tetrahedral Equation and Higher Hamiltonians of $2d$ Quantum Integrable Systems”, SIGMA, 13 (2017), 031, 14 pp.
Citation in format AMSBIB
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    • This publication is cited in the following 3 articles:
    Citing articles in Google Scholar: Russian citations, English citations
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    		Symmetry, Integrability and Geometry: Methods and Applications
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