On the algebra of nonlocal symmetries for the 4D Martínez
Alonso-Shabat equation

J 2021

On the algebra of nonlocal symmetries for the 4D Martínez Alonso-Shabat equation

KRASILSHCHIK, Iosif Semjonovich and Petr VOJČÁK

Basic information

Original name

On the algebra of nonlocal symmetries for the 4D Martínez Alonso-Shabat equation

Authors

KRASILSHCHIK, Iosif Semjonovich (643 Russian Federation, guarantor) and Petr VOJČÁK (203 Czech Republic, belonging to the institution)

Edition

Journal of Geometry and Physics, Amsterdam, Elsevier B.V. 2021, 0393-0440

Other information

Language

English

Type of outcome

Článek v odborném periodiku

Field of Study

10101 Pure mathematics

Country of publisher

Netherlands

Confidentiality degree

není předmětem státního či obchodního tajemství

References:

Journal of Geometry and Physics

RIV identification code

RIV/47813059:19610/21:A0000098

Organization unit

Mathematical Institute in Opava

DOI

http://dx.doi.org/10.1016/j.geomphys.2021.104122

UT WoS

000636084800017

Keywords in English

4D Martinez Alonso-Shabat equation; Universal hierarchy equation; Lax pairs; Differential coverings; Nonlocal symmetries

Abstract

V originále

We consider the 4D Martinez Alonso-Shabat equation epsilon u(ty) = u(z)u(xy) - u(y)u(xz) (also referred to as the universal hierarchy equation) and using its known Lax pair construct two infinite-dimensional differential coverings over epsilon. In these coverings, we give a complete description of the Lie algebras of nonlocal symmetries. In particular, our results generalize the ones obtained in Morozov and Sergyeyev (2014) and contain the constructed there infinite hierarchy of commuting symmetries as a subalgebra in a much bigger Lie algebra.

Citovat

KRASILSHCHIK, Iosif Semjonovich and Petr VOJČÁK. On the algebra of nonlocal symmetries for the 4D Martínez Alonso-Shabat equation. Journal of Geometry and Physics. Amsterdam: Elsevier B.V., 2021, vol. 163, may, p. "104122-1"-"104122-12", 12 pp. ISSN 0393-0440. Available from: https://dx.doi.org/10.1016/j.geomphys.2021.104122.

@article{54483,
   author = {Krasilshchik, Iosif Semjonovich and Vojčák, Petr},
   article_location = {Amsterdam},
   article_number = {may},
   doi = {http://dx.doi.org/10.1016/j.geomphys.2021.104122},
   keywords = {4D Martinez Alonso-Shabat equation; Universal hierarchy equation; Lax pairs; Differential coverings; Nonlocal symmetries},
   language = {eng},
   issn = {0393-0440},
   journal = {Journal of Geometry and Physics},
   title = {On the algebra of nonlocal symmetries for the 4D Martínez Alonso-Shabat equation},
   url = {https://www.sciencedirect.com/science/article/pii/S0393044021000139},
   volume = {163},
   year = {2021}
}

TY  - JOUR
ID  - 54483
AU  - Krasilshchik, Iosif Semjonovich - Vojčák, Petr
PY  - 2021
TI  - On the algebra of nonlocal symmetries for the 4D Martínez Alonso-Shabat equation
JF  - Journal of Geometry and Physics
VL  - 163
IS  - may
SP  - "104122-1"-"104122-12"
EP  - "104122-1"-"104122-12"
PB  - Elsevier B.V.
SN  - 03930440
KW  - 4D Martinez Alonso-Shabat equation
KW  - Universal hierarchy equation
KW  - Lax pairs
KW  - Differential coverings
KW  - Nonlocal symmetries
UR  - https://www.sciencedirect.com/science/article/pii/S0393044021000139
N2  - We consider the 4D Martinez Alonso-Shabat equation epsilon u(ty) = u(z)u(xy) - u(y)u(xz) (also referred to as the universal hierarchy equation) and using its known Lax pair construct two infinite-dimensional differential coverings over epsilon. In these coverings, we give a complete description of the Lie algebras of nonlocal symmetries. In particular, our results generalize the ones obtained in Morozov and Sergyeyev (2014) and contain the constructed there infinite hierarchy of commuting symmetries as a subalgebra in a much bigger Lie algebra.
ER  -

KRASILSHCHIK, Iosif Semjonovich and Petr VOJČÁK. On the algebra of nonlocal symmetries for the 4D Martínez Alonso-Shabat equation. \textit{Journal of Geometry and Physics}. Amsterdam: Elsevier B.V., 2021, vol.~163, may, p.~''104122-1''-''104122-12'', 12 pp. ISSN~0393-0440. Available from: https://dx.doi.org/10.1016/j.geomphys.2021.104122.

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