Darboux transformation and analytic solutions for a generalized super-NLS-mKdV equation

Xue Guan; Wenjun Liu; Qin Zhou; Anjan Biswas

doi:10.1007/s11071-019-05275-0

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Darboux transformation and analytic solutions for a generalized super-NLS-mKdV equation

Journal article

Peer reviewed

Darboux transformation and analytic solutions for a generalized super-NLS-mKdV equation

Xue Guan, Wenjun Liu, Qin Zhou and Anjan Biswas

Nonlinear dynamics, Vol.98(2), pp.1491-1500

01/10/2019

DOI: https://doi.org/10.1007/s11071-019-05275-0

Abstract

Engineering

Engineering, Mechanical

Mechanics

Science & Technology

Technology

Darboux transformation is an efficient method for solving different nonlinear partial differential equations. In this paper, on the basis of a Lie super-algebras, a generalized super-NLS-mKdV equation is solved by the Darboux transformation. The analytic solutions are presented with the help of symbolic computation. Besides, two special cases are given to make the solution intuitive. Dynamic properties of solitons are also discussed.

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Title: Darboux transformation and analytic solutions for a generalized super-NLS-mKdV equation
Creators - without role: Xue Guan - Beijing University of Posts and Telecommunications
Wenjun Liu - Beijing University of Posts and Telecommunications
Qin Zhou - Wuhan Donghu University
Anjan Biswas - King Abdulaziz University
Publication Details: Nonlinear dynamics, Vol.98(2), pp.1491-1500
Publisher: Springer Nature
Number of pages: 10
Identifiers: 9935814608331
Academic Unit: King Abdulaziz University
Language: English
Resource Type: Journal article