N-Soliton Solution in Wronskian Form for a Generalized Variable-Coefficient Korteweg--de Vries Equation

Chin. Phys. Lett.

2008, Vol. 25

Issue (11): 3890-3893 DOI:

Original Articles

N-Soliton Solution in Wronskian Form for a Generalized Variable-Coefficient Korteweg--de Vries Equation

XU Xiao-Ge^1,2,4, MENG Xiang-Hua³, GAO Yi-Tian²

¹School of Science, Beijing University of Aeronautics and Astronautics, Beijing 100083²Ministry-of-Education Key Laboratory of Fluid Mechanics and National Laboratory for Computational Fluid Dynamics, Beijing University of Aeronautics and Astronautics, Beijing 100083³School of Science, Beijing University of Posts and Telecommunications, Beijing 100876⁴Beijing Information Technology Institute, Beijing 100101

Cite this article:

XU Xiao-Ge, MENG Xiang-Hua, GAO Yi-Tian 2008 Chin. Phys. Lett. 25 3890-3893

Download: PDF(235KB)
Export: BibTeX | EndNote | Reference Manager | ProCite | RefWorks

Abstract

We concentrate on finding exact solutions for a generalized variable-coefficient Korteweg--de Vries equation of physically significance. The analytic N-soliton solution in Wronskian form for such a model is postulated and verified by direct substituting the solution into the bilinear form by virtue of the Wronskian technique. Additionally, the bilinear auto-Bäcklund transformation between the (N-1)- and N-soliton solutions is verified.

Keywords: 05.45.Yv 02.30.Jr 02.30.Ik

Received: 18 April 2008 Published: 25 October 2008

PACS:	05.45.Yv	(Solitons)
	02.30.Jr	(Partial differential equations)
	02.30.Ik	(Integrable systems)

TRENDMD:

URL:

https://cpl.iphy.ac.cn/ OR https://cpl.iphy.ac.cn/Y2008/V25/I11/03890

Service
	E-mail this article
	E-mail Alert
	RSS
Articles by authors
	XU Xiao-Ge
	MENG Xiang-Hua
	GAO Yi-Tian

[1] Lamb G L Jr 1980 Elements of Soliton Theory (New
York: Wiley)
[2] Ablowitz M J and Clarkson P A 1991 Solitons,
Nonlinear Evolution Equations and Inverse Scattering (Cambridge:
Cambridge University Press) Bullough R K and Caudrey P J 1980 Solitons
(Berlin: Springer)
[3] Gardner C S, Greene J M, Kruskal M D and Miura R M 1967
Phys. Rev. Lett. 19 1095 Gardner C S, Greene J M, Kruskal M D and Miura R M 1974
Commun. Pure Appl. Math. 27 97
[4] Ablowitz M J, Kaup D J, Newell A C and Segur H 1973
Phys. Rev. Lett. 30 1262 Ablowitz M J, Kaup D J, Newell A C and Segur H 1973
Phys. Rev. Lett. 31 125
[5] Hirota R 1971 Phys. Rev. Lett. 27 1192 Hirota R 1974 Prog. Theor. Phys. Suppl. 52
1498 Hirota R, Hu X and Tang X 2003 J. Math. Anal. Appl.
288 326 Hu X B 1994 J. Phys. A: Math. Gen. 27 1331
[6] Satsuma J 1979 J. Phys. Soc. Jpn. 46 395
[7] Freeman N C and Nimmo J J C 1983 Phys. Lett. A
95 1 Nimmo J J C and Freeman N C 1983 Phys. Lett. A
95 4
[8] Chan W L and Zhang X 1994 J. Phys. A 27 407
[9] Zhao X Q, Tang D B and Wang L M 2005 Phys. Lett. A
346 288
[10] Ding S S, Sun W J and Zhu D C 2008 Appl. Math.
Comput. 199 268
[11] Zhang D J and Chen D Y 2004 J. Phys. A 37
851
[12] Xu X G, Meng X H and Gao Y T 2008 Nonlinear
Anal. (submitted)
[13] Hirota R 2004 The Direct Method in Soliton Theory
(Cambridge: Cambridge University Press)

Related articles from Frontiers Journals

[1]	E. M. E. Zayed, S. A. Hoda Ibrahim. Exact Solutions of Nonlinear Evolution Equations in Mathematical Physics Using the Modified Simple Equation Method[J]. Chin. Phys. Lett., 2012, 29(6): 3890-3893
[2]	WU Yong-Qi. Exact Solutions to a Toda-Like Lattice Equation in 2+1 Dimensions[J]. Chin. Phys. Lett., 2012, 29(6): 3890-3893
[3]	HE Jing-Song, WANG You-Ying, LI Lin-Jing. Non-Rational Rogue Waves Induced by Inhomogeneity[J]. Chin. Phys. Lett., 2012, 29(6): 3890-3893
[4]	YANG Zheng-Ping, ZHONG Wei-Ping. Self-Trapping of Three-Dimensional Spatiotemporal Solitary Waves in Self-Focusing Kerr Media[J]. Chin. Phys. Lett., 2012, 29(6): 3890-3893
[5]	CUI Kai. New Wronskian Form of the N-Soliton Solution to a (2+1)-Dimensional Breaking Soliton Equation[J]. Chin. Phys. Lett., 2012, 29(6): 3890-3893
[6]	S. Hussain. The Effect of Spectral Index Parameter κ on Obliquely Propagating Solitary Wave Structures in Magneto-Rotating Plasmas[J]. Chin. Phys. Lett., 2012, 29(6): 3890-3893
[7]	CAO Ce-Wen,ZHANG Guang-Yao. Lax Pairs for Discrete Integrable Equations via Darboux Transformations**[J]. Chin. Phys. Lett., 2012, 29(5): 3890-3893
[8]	YAN Jia-Ren,ZHOU Jie,AO Sheng-Mei. The Dynamics of a Bright–Bright Vector Soliton in Bose–Einstein Condensation**[J]. Chin. Phys. Lett., 2012, 29(5): 3890-3893
[9]	DAI Zheng-De, WU Feng-Xia, LIU Jun and MU Gui. New Mechanical Feature of Two-Solitary Wave to the KdV Equation**[J]. Chin. Phys. Lett., 2012, 29(4): 3890-3893
[10]	Mohammad Najafi,Maliheh Najafi,M. T. Darvishi. New Exact Solutions to the (2+1)-Dimensional Ablowitz–Kaup–Newell–Segur Equation: Modification of the Extended Homoclinic Test Approach**[J]. Chin. Phys. Lett., 2012, 29(4): 3890-3893
[11]	S. Karimi Vanani, F. Soleymani. Application of the Homotopy Perturbation Method to the Burgers Equation with Delay[J]. Chin. Phys. Lett., 2012, 29(3): 3890-3893
[12]	WANG Jun-Min. Periodic Wave Solutions to a (3+1)-Dimensional Soliton Equation[J]. Chin. Phys. Lett., 2012, 29(2): 3890-3893
[13]	Saliou Youssoufa, Victor K. Kuetche, Timoleon C. Kofane. Generation of a New Coupled Ultra-Short Pulse System from a Group Theoretical Viewpoint: the Cartan Ehresman Connection[J]. Chin. Phys. Lett., 2012, 29(2): 3890-3893
[14]	Hermann T. Tchokouansi, Victor K. Kuetche, Abbagari Souleymanou, Thomas B. Bouetou, Timoleon C. Kofane. Generating a New Higher-Dimensional Ultra-Short Pulse System: Lie-Algebra Valued Connection and Hidden Structural Symmetries[J]. Chin. Phys. Lett., 2012, 29(2): 3890-3893
[15]	LIU Ping, FU Pei-Kai. Note on the Lax Pair of a Coupled Hybrid System**[J]. Chin. Phys. Lett., 2012, 29(1): 3890-3893

Viewed

Full text

Abstract