Remarks on the Yablonskii-Vorob’ev polynomials

Makoto Taneda

doi:10.1017/S0027763000007431

Abstract

Core share and HTML view are not available for this content. However, as you have access to this content, a full PDF is available via the ‘Save PDF’ action button.

We study the Yablonskii-Vorob’ev polynomial associated with the second Painlevé equation. To study other special polynomials (Okamoto polynomials, Umemura polynomials) associated with the Painlevé equations, our purely algebraic approach is useful.

References

[1] Date, E., Jimbo, M. and Miwa, T., Soriton no suri, Iwanamikouza, Ouyou sugaku (in Japanese), Iwanami.Google Scholar

[2] Fukutani, S., Okamoto, K. and Umemura, H., Special polynomials associated with the rational solutions of the second and fourth Painlevé equations, Nagoya Math. J., 159 (2000), 179–200.CrossRef Google Scholar

[3] Kajiwara, K. and Ohta, Y., Determinant structure of the rational solutions for the Painlevé II equation, J. Math. Phys., 37 (1996), 4693–4704.CrossRef Google Scholar

[4] Noumi, M. and Yamada, Y., Symmetries in the fourth Painlevé equation and the Okamoto polynomials, Preprint.CrossRef Google Scholar

[5] Noumi, M., Umemura polynomials for the Painlevé V equation, Physics Letters, A 247 (1998), 65–69.CrossRef Google Scholar

[6] Okamoto, K., Studies on the Painlevé equations III, Math. Ann., 275 (1986), 221–255.CrossRef Google Scholar

[7] Umemura, H., Painlevé equations and classical functions, Sugaku (in Japanese), 47 (1996), 341–359.Google Scholar

[8] Umemura, H., Special Polynomials associated with the Painlevé equation, I, Proceedings of workshop on the Painlevé equations (edited by Winternitz), Montreal, (1996).Google Scholar

[9] Umemura, H. and Watanabe, H., Solutions of the second and fourth Painlevé equations, Nagoya Math J., 151 (1998), 1–24.CrossRef Google Scholar

Crossref Citations

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Clarkson, Peter A. 2003. Remarks on the Yablonskii–Vorob'ev polynomials. Physics Letters A, Vol. 319, Issue. 1-2, p. 137.

Clarkson, Peter A 2003. Painlevé equations—nonlinear special functions. Journal of Computational and Applied Mathematics, Vol. 153, Issue. 1-2, p. 127.

Clarkson, Peter A. 2003. The fourth Painlevé equation and associated special polynomials. Journal of Mathematical Physics, Vol. 44, Issue. 11, p. 5350.

Clarkson, Peter A 2003. The third Painlev equation and associated special polynomials. Journal of Physics A: Mathematical and General, Vol. 36, Issue. 36, p. 9507.

Clarkson, Peter A and Mansfield, Elizabeth L 2003. The second Painlev equation, its hierarchy and associated special polynomials. Nonlinearity, Vol. 16, Issue. 3, p. R1.

Clarkson, Peter A. 2005. Theory and Applications of Special Functions. Vol. 13, Issue. , p. 123.

Clarkson, Peter A. 2005. Special polynomials associated with rational solutions of the fifth Painlevé equation. Journal of Computational and Applied Mathematics, Vol. 178, Issue. 1-2, p. 111.

Clarkson, Peter A. 2006. Special Polynomials Associated with Rational Solutions of the Painlevé Equations and Applications to Soliton Equations. Computational Methods and Function Theory, Vol. 6, Issue. 2, p. 329.

Demina, Maria V. and Kudryashov, Nikolai A. 2007. The Yablonskii–Vorob’ev polynomials for the second Painlevé hierarchy. Chaos, Solitons & Fractals, Vol. 32, Issue. 2, p. 526.

Filipuk, Galina V. and Clarkson, Peter A. 2008. The Symmetric Fourth Painlevé Hierarchy and Associated Special Polynomials. Studies in Applied Mathematics, Vol. 121, Issue. 2, p. 157.

Kudryashov, Nikolai A. and Demina, Maria V. 2008. The generalized Yablonskii–Vorob'ev polynomials and their properties. Physics Letters A, Vol. 372, Issue. 29, p. 4885.

Common, Alan K and Hone, Andrew N W 2008. Rational solutions of the discrete time Toda lattice and the alternate discrete Painlevé II equation. Journal of Physics A: Mathematical and Theoretical, Vol. 41, Issue. 48, p. 485203.

CLARKSON, PETER A. 2008. RATIONAL SOLUTIONS OF THE BOUSSINESQ EQUATION. Analysis and Applications, Vol. 06, Issue. 04, p. 349.

Kudryashov, Nikolay A. 2014. Higher Painlevé transcendents as special solutions of some nonlinear integrable hierarchies. Regular and Chaotic Dynamics, Vol. 19, Issue. 1, p. 48.

Yang, Bo and Yang, Jianke 2021. Rogue wave patterns in the nonlinear Schrödinger equation. Physica D: Nonlinear Phenomena, Vol. 419, Issue. , p. 132850.

Dong, Jieyang Ling, Liming and Zhang, Xiaoen 2022. Kadomtsev–Petviashvili equation: One-constraint method and lump pattern. Physica D: Nonlinear Phenomena, Vol. 432, Issue. , p. 133152.

Yang, Bo and Yang, Jianke 2022. Pattern Transformation in Higher-Order Lumps of the Kadomtsev–Petviashvili I Equation. Journal of Nonlinear Science, Vol. 32, Issue. 4,

Shapiro, Boris and Tater, Miloš 2022. On spectral asymptotic of quasi-exactly solvable quartic potential. Analysis and Mathematical Physics, Vol. 12, Issue. 1,

Chakravarty, Sarbarish and Zowada, Michael 2022. Classification of KPI lumps. Journal of Physics A: Mathematical and Theoretical, Vol. 55, Issue. 21, p. 215701.

Zhang, Guangxiong Huang, Peng Feng, Bao-Feng and Wu, Chengfa 2023. Rogue Waves and Their Patterns in the Vector Nonlinear Schrödinger Equation. Journal of Nonlinear Science, Vol. 33, Issue. 6,

Download full list

Article contents

Remarks on the Yablonskii-Vorob’ev polynomials

Abstract

Keywords

References

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Article contents

Remarks on the Yablonskii-Vorob’ev polynomials

Abstract

Keywords

References

Save article to Kindle

Save article to Dropbox

Save article to Google Drive

Reply to: Submit a response

Your details

You have entered the maximum number of contributors

Conflicting interests