In this paper,we propose a new method,the variable separation technique,for obtaining a breather and rogue wave solution to the nonlinear evolution equation.Integrable systems of the derivative nonlinear Schr?dinger type are used as three examples to illustrate the effectiveness of the presented method.We then obtain a family of rational solutions.This family of solutions includes the Akhmediev breather,the Kuznetsov-Ma breather,versatile rogue waves,and various interactions of localized waves.Moreover,the main characteristics of these solutions are discussed and some graphics are presented.More importantly,our results show that more abundant and novel localized waves may exist in the multicomponent coupled equations than in the uncoupled ones.

Weiying Wang;Xiubin Wang

School of Economics,Harbin University of Commerce,Harbin 150028,China;Department of Mathematics,Harbin Institute of Technology,Harbin 150001,China

理论物理

[1]Weiying Wang;Xiubin Wang-.Dynamics of breathers and rogue waves in scalar and multicomponent nonlinear systems)[J].理论物理,2022(04):1-12

breathers

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