Matrix integrable fifth-order mKdV equations and their soliton solutions

doi:10.1088/1674-1056/ac7dc1

Abstract We consider matrix integrable fifth-order mKdV equations via a kind of group reductions of the Ablowitz-Kaup-Newell-Segur matrix spectral problems. Based on properties of eigenvalue and adjoint eigenvalue problems, we solve the corresponding Riemann-Hilbert problems, where eigenvalues could equal adjoint eigenvalues, and construct their soliton solutions, when there are zero reflection coefficients. Illustrative examples of scalar and two-component integrable fifth-order mKdV equations are given.

Keywords: matrix integrable equation Riemann-Hilbert problem soliton

Received: 23 May 2022
Revised: 10 June 2022
Accepted manuscript online: 02 July 2022

PACS:	02.30.Ik	(Integrable systems)
	05.45.Yv	(Solitons)

Fund: The work was supported in part by the National Natural Science Foundation of China (Grant Nos. 11975145, 11972291, and 51771083), the Ministry of Science and Technology of China (Grant No. G2021016032L), and the Natural Science Foundation for Colleges and Universities in Jiangsu Province, China (Grant No. 17 KJB 110020).

Corresponding Authors: Wen-Xiu Ma
E-mail: mawx@cas.usf.edu

Cite this article:

Wen-Xiu Ma(马文秀) Matrix integrable fifth-order mKdV equations and their soliton solutions 2023 Chin. Phys. B 32 020201

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Matrix integrable fifth-order mKdV equations and their soliton solutions

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