Hostname: page-component-586b7cd67f-rcrh6 Total loading time: 0 Render date: 2024-11-25T23:59:49.594Z Has data issue: false hasContentIssue false

Integrable Properties of a Variant of the Discrete Hungry Toda Equations and Their Relationship to Eigenpairs of Band Matrices

Published online by Cambridge University Press:  31 January 2018

Yusuke Nishiyama*
Affiliation:
Graduate School of Science and Engineering, Doshisha University, 1-3, Tatara-miyakodani, Kyotanabe, Kyoto, 610-0394, Japan
Masato Shinjo*
Affiliation:
Graduate School of Informatics, Kyoto University, Yoshida-Hommachi, Sakyo-ku, Kyoto, 606-8501, Japan
Koichi Kondo*
Affiliation:
Graduate School of Science and Engineering, Doshisha University, 1-3, Tatara-miyakodani, Kyotanabe, Kyoto, 610-0394, Japan
Masashi Iwasaki*
Affiliation:
Faculty of Life and Environmental Science, Kyoto Prefectural University, 1-5, Nakaragi-cho, Shimogamo, Sakyo-ku, Kyoto, 606-8522, Japan
*
*Corresponding author. Email addresses:[email protected] (Y. Nishiyama), [email protected] (M. Shinjo), [email protected] (K. Kondo), [email protected] (M. Iwasaki)
*Corresponding author. Email addresses:[email protected] (Y. Nishiyama), [email protected] (M. Shinjo), [email protected] (K. Kondo), [email protected] (M. Iwasaki)
*Corresponding author. Email addresses:[email protected] (Y. Nishiyama), [email protected] (M. Shinjo), [email protected] (K. Kondo), [email protected] (M. Iwasaki)
*Corresponding author. Email addresses:[email protected] (Y. Nishiyama), [email protected] (M. Shinjo), [email protected] (K. Kondo), [email protected] (M. Iwasaki)
Get access

Abstract

The Toda equation and its variants are studied in the filed of integrable systems. One particularly generalized time discretisation of the Toda equation is known as the discrete hungry Toda (dhToda) equation, which has two main variants referred to as the dhTodaI equation and dhTodaII equation. The dhToda equations have both been shown to be applicable to the computation of eigenvalues of totally nonnegative (TN) matrices, which are matrices without negative minors. The dhTodaI equation has been investigated with respect to the properties of integrable systems, but the dhTodaII equation has not. Explicit solutions using determinants and matrix representations called Lax pairs are often considered as symbolic properties of discrete integrable systems. In this paper, we clarify the determinant solution and Lax pair of the dhTodaII equation by focusing on an infinite sequence. We show that the resulting determinant solution firmly covers the general solution to the dhTodaII equation, and provide an asymptotic analysis of the general solution as discrete-time variable goes to infinity.

Type
Research Article
Copyright
Copyright © Global-Science Press 2017 

Access options

Get access to the full version of this content by using one of the access options below. (Log in options will check for institutional or personal access. Content may require purchase if you do not have access.)

References

[1] Bogoyavlensky, O. I., Integrable discretizations of the KdV equation, Phys. Lett. A 134, 3438 (1988).Google Scholar
[2] Fukuda, A., Yamamoto, Y., Iwasaki, M., Ishiwata, E., and Y.Nakamura, A Bäcklund transformation between two integrable discrete hungry systems, Phys. Lett. A 375, 303308 (2011).Google Scholar
[3] Fukuda, A., Ishiwata, E., Yamamoto, Y., Iwasaki, M., and Nakamura, Y., Integrable discrete hungry systems and their related matrix eigenvalue, Ann. Mat. Pura Appl. 192, 423445 (2013).Google Scholar
[4] Grammaticos, B., Kosmann-Schwarzbach, Y., and Tamizhmani, T., Discrete Integrable Systems, Springer-Verlag, Berlin Heidelberg, 2004.Google Scholar
[5] Hama, Y., Fukuda, A., Yamamoto, Y., Iwasaki, M., Ishiwata, E., and Nakamura, Y., On some properties of a discrete hungry Lotka-Volterra system of multiplicative type, J. Math-for-Indust. 4, 515 (2012).Google Scholar
[6] Henrici, P., Applied and Computational Complex Analysis Vol. 1, John Wiley & Sons, New York, 1974.Google Scholar
[7] Hirota, R., Discrete analogue of a generalized Toda equation, J. Phys. Soc. Japan 50, 37853791 (1981).Google Scholar
[8] Itoh, Y., Integrals of a Lotka-Volterra system of odd number of variables, Prog. Theor. Phys. 78, 507510 (1987).Google Scholar
[9] Pinkus, A., Totally Positive Matrices, Cambridge University Press, New York, 2010.Google Scholar
[10] Rutishauser, H., Lectures on Numerical Mathematics, Birkhäuser, Boston, 1990.Google Scholar
[11] Sumikura, R., Fukuda, A., Ishiwata, E., Yamamoto, Y., Iwasaki, M., and Nakamura, Y., Eigenvalue computation of totally nonnegative upper Hessenberg matrices based on a variant of the discrete hungry Toda equation, AIP Conference Proceedings 1648, pp. 690006 (2015).Google Scholar
[12] Spiridonov, V. and Zhedanov, A., Discrete-time Volterra chain and classical orthogonal polynomials, J. Phys. A 30, 87278737 (1997).Google Scholar
[13] Tokihiro, T., Nagai, A., and Satsuma, J., Proof of solitonical nature of box and ball systems by means of inverse ultra-discretization, Inverse Probl. 15, 16391662 (1999).Google Scholar