A fifth order semidiscrete mKdV equation 被引量：1

A fifth order semidiscrete mKdV equation

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摘要 In this paper, aiming to get more insight on the relation between the higher order semidiscrete mKdV equations and higher order mKdV equations, we construct a fifth order semidiscrete mKdV equation from the three known semidiscrete mKdV fluxes. We not only give its Lax pairs, Darboux transformation, explicit solutions and infinitely many conservation laws, but also show that their continuous limits yield the corresponding results for the fifth order mKdV equation. We thus conclude that the fifth order discrete mKdV equation is extremely an useful discrete scheme for the fifth order mtCdV equation. In this paper,aiming to get more insight on the relation between the higher order semidiscrete mKdV equations and higher order mKdV equations,we construct a fifth order semidiscrete mKdV equation from the three known semidiscrete mKdV fluxes.We not only give its Lax pairs,Darboux transformation,explicit solutions and infinitely many conservation laws,but also show that their continuous limits yield the corresponding results for the fifth order mKdV equation.We thus conclude that the fifth order discrete mKdV equation is extremely an useful discrete scheme for the fifth order mKdV equation.

作者 ZHOU Tong ZHU ZuoNong HE Peng

机构地区 Department of Mathematics

出处《Science China Mathematics》 SCIE 2013年第1期123-134,共12页 中国科学：数学（英文版）

基金 supported by National Natural Science Foundation of China (Grant No.10971136) the Ministry of Education and Innovation of Spain (Grant No.MTM2009-12670)

关键词 fifth order semidiscrete mKdV equation Darboux transformation soliton solutions conversationlaws continuous limits mKdV方程半离散五阶 Darboux变换 Lax对守恒律无穷多高阶

分类号 O241.8 [理学—计算数学]

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1Ahlowitz M J, Clarkson P A. Soliton nonlinear evolution equation and inverse scattering. In: London Math Soc, Lecture Note Series, vol. 149. Cambridge: Cambridge University Press, 1991.
2Ablowitz M J, Ladik J F. A nonlinear difference scheme and inverse scattering. Stud Appl Math, 1996, 55:213-229.
3Ablowitz M J, Ladik J F. Nonlinear differential-difference equations and Fourier analiyses. J Math Phys, 1976, 17: 1011-1018.
4Ablowitz M J, Ohta Y, Trubatch A D. On integrability and chaos in discrete systems. Chaos Solitons Fractals, 2000, 11:159-169.
5Ablowitz M J, Ramani A, Segur H. A connection between nonlinear evolution equations and ordinary differential equations of P-Type I. J Math Phys, 1980, 21:715-721.
6Boiti M, Bruschi M, Pempinelli F, et al. A discrete Schrgdinger spectral problem and associated evolution equations. J Phys A, 2003, 36:139-156.
7Campbell D K, Bishop A R, Fessev K. Polarons in quasi-one-dimensional systems. Phys Rev B, 1982, 26:6862-6874.
8Hirota R. Nonlinear partial difference equations I. A difference analogue of the Korteweg-de Vires equation. J Phys Soc Japan, 1977, 43:1424-1429.
9Kupershmidt B A. Discrete Lax Equations and Differential-difference Calculus. Asterisqne, No.123. Paris: Soc Math France, 1985.
10Li Y S, Ma W X. A nonconfocal involutive system and constrained flows associated with the MKdV equation. J Math Phys, 2002,43:4950-4962.

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1Matteo PETRERA Yuri B. SURIS.S. V. Kovalevskaya system, its generalization and discretization[J].Frontiers of Mathematics in China,2013,8(5):1047-1065. 被引量：1

引证文献1

1ZHANG Ying Nan,CHANG Xiang Ke,HU Juan,HU Xing Biao,TAM Hon-Wah.Integrable discretization of soliton equations via bilinear method and Backlund transformation[J].Science China Mathematics,2015,58(2):279-296.

1CEMIL TUNC(Yuzuncu Yil University, Egitim Faculty,65080,VAN,TURKEY).ON THE BOUNDEDNESS AND THE STABILITY RESULTS FOR THE SOLUTION OF CERTAIN FIFTH ORDER DIFFERENTIAL EQUATIONS[J].Annals of Differential Equations,1996,12(3):259-266. 被引量：1
2A.M.A.Abou El Ela & A.I.Sadek (Faculty of Science, Assiut University, 71516 Assiut, EGYPT).ON THE BOUNDEDNESS OF A CERTAIN SYSTEM OF FIFTH-ORDER DIFFERENTIAL EQUATION[J].Annals of Differential Equations,1998,14(1):3-12. 被引量：1
3李志斌,柳银萍,王明亮.EXACT SOLITARY WAVE AND SOLITONSOLUTIONS OF THE FIFTH ORDER MODEL EQUATION[J].Acta Mathematica Scientia,2002,22(1):138-144. 被引量：2
4Fifth international congress on sound and vibration[J].Chinese Journal of Acoustics,1997,16(1):96-96.
5Nagendra Nath Mondal.Does the Fifth Sate of Matter Originate the Early Universe？[J].Journal of Physical Science and Application,2015,5(6):407-414.
6刘希忠,俞军,任博.New solutions from nonlocal symmetry of the generalized fifth order KdV equation[J].Chinese Physics B,2015,24(8):137-141.
7张宇飞,符松.第五届国际计算流体力学大会介绍[J].力学进展,2008,38(5):652-652. 被引量：1
8王勤龙,黄文韬.LIMIT CYCLES BIFURCATED FROM THE ORIGIN AND EQUATOR FOR A CLASS OF FIFTH SYSTEM[J].Annals of Differential Equations,2004,20(1):92-98.
9Fu Yuhua Senior Engineer, China Offshore Oil Production Research Center, P. O. Box 9607, Beijing 100086.Simplified Method and Improved Solution for Deriving Fifth Order Stokes Wave[J].China Ocean Engineering,1997,12(4):431-440.
10ADESINA Olufemi Adeyinka.A Result on Uniformly Dissipative Solutions for a Certain Fifth Order Non-Linear Differential Equation[J].Journal of Mathematical Research and Exposition,2006,26(3):465-470.

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A fifth order semidiscrete mKdV equation 被引量：1

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