Vector rational and semi-rational rogue wave solutions in the coupled complex modified Korteweg–de Vries equations

With the aid of a generalized Darboux transformation (DT), we derive a hierarchy of rogue wave solutions to the coupled complex modified Korteweg–de Vries (mKdV) equations. Based on modulation instability (MI), two types of nth order rational rogue wave solutions in compact determinant forms are pre...

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Bibliographic Details
Published in:Wave motion 2020-01, Vol.92, p.102425, Article 102425
Main Authors: Ye, Rusuo, Zhang, Yi, Zhang, Qinyu, Chen, Xiaotong
Format: Article
Language:English
Subjects:
Coupled complex mKdV equations
Darboux transformation
Dynamics
Korteweg-Devries equation
Mathematical analysis
Modulation instability
Nonlinear equations
Nonlinear optics
Optics
Propagation
Quadrilaterals
Rational rogue waves
Surface waves
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Summary:With the aid of a generalized Darboux transformation (DT), we derive a hierarchy of rogue wave solutions to the coupled complex modified Korteweg–de Vries (mKdV) equations. Based on modulation instability (MI), two types of nth order rational rogue wave solutions in compact determinant forms are presented. Especially, the rational rogue wave solutions up to the second-order are performed explicitly and graphically. We find that there exist typical bright–dark composites and rogue wave doublets in first-order case and four or six fundamental rogue waves in second-order case. With appropriate choices of free parameters, the distribution shapes with four fundamental rogue waves admit triangular, quadrilateral, and line structures. Furthermore, triangular, ring, quadrilateral and line patterns can emerge with six fundamental rogue waves. Moreover, we exhibit the first-order semi-rational rogue wave solutions which can demonstrate the coexistence of one rational rogue wave and one breather. Our results can be applicable to the study of rogue wave manifestations in nonlinear optics. •We derive a hierarchy of rogue wave solutions to the coupled complex modified Korteweg–de Vries equations by virtue of Darboux transformation.•Based on modulation instability, two types of n-th order rational rogue wave solutions in compact determinant forms are presented.
ISSN:0165-2125
1878-433X
DOI:10.1016/j.wavemoti.2019.102425