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ISOMONODROMIC DEFORMATIONS OF HEUN AND PAINLEVÉ EQUATIONS. / Slavyanov, S.Yu.

в: Theoretical and Mathematical Physics, № 3, 2000, стр. 744-753.

Результаты исследований: Научные публикации в периодических изданияхстатья

Harvard

Slavyanov, SY 2000, 'ISOMONODROMIC DEFORMATIONS OF HEUN AND PAINLEVÉ EQUATIONS', Theoretical and Mathematical Physics, № 3, стр. 744-753. <http://elibrary.ru/item.asp?id=11876870>

APA

Slavyanov, S. Y. (2000). ISOMONODROMIC DEFORMATIONS OF HEUN AND PAINLEVÉ EQUATIONS. Theoretical and Mathematical Physics, (3), 744-753. http://elibrary.ru/item.asp?id=11876870

Vancouver

Slavyanov SY. ISOMONODROMIC DEFORMATIONS OF HEUN AND PAINLEVÉ EQUATIONS. Theoretical and Mathematical Physics. 2000;(3):744-753.

Author

Slavyanov, S.Yu. / ISOMONODROMIC DEFORMATIONS OF HEUN AND PAINLEVÉ EQUATIONS. в: Theoretical and Mathematical Physics. 2000 ; № 3. стр. 744-753.

BibTeX

@article{7cb78f215ac640e0a7c9995c7cb9104a,
title = "ISOMONODROMIC DEFORMATIONS OF HEUN AND PAINLEV{\'E} EQUATIONS",
abstract = "Continuing the study of the relationship between the Heun and the Painlev{\'e} classes of equations reported in two previous papers, we formulate and prove the main theorem expressing this relationship. We give a Hamiltonian interpretation of the isomonodromic deformation condition and propose an alternative classification of the Painlev{\'e} equations, which includes ten equations.",
author = "S.Yu. Slavyanov",
year = "2000",
language = "English",
pages = "744--753",
journal = "Theoretical and Mathematical Physics (Russian Federation)",
issn = "0040-5779",
publisher = "Springer Nature",
number = "3",

}

RIS

TY - JOUR

T1 - ISOMONODROMIC DEFORMATIONS OF HEUN AND PAINLEVÉ EQUATIONS

AU - Slavyanov, S.Yu.

PY - 2000

Y1 - 2000

N2 - Continuing the study of the relationship between the Heun and the Painlevé classes of equations reported in two previous papers, we formulate and prove the main theorem expressing this relationship. We give a Hamiltonian interpretation of the isomonodromic deformation condition and propose an alternative classification of the Painlevé equations, which includes ten equations.

AB - Continuing the study of the relationship between the Heun and the Painlevé classes of equations reported in two previous papers, we formulate and prove the main theorem expressing this relationship. We give a Hamiltonian interpretation of the isomonodromic deformation condition and propose an alternative classification of the Painlevé equations, which includes ten equations.

M3 - Article

SP - 744

EP - 753

JO - Theoretical and Mathematical Physics (Russian Federation)

JF - Theoretical and Mathematical Physics (Russian Federation)

SN - 0040-5779

IS - 3

ER -

ID: 5144649