期刊
PHYSICS LETTERS A
卷 407, 期 -, 页码 -出版社
ELSEVIER
DOI: 10.1016/j.physleta.2021.127472
关键词
Focusing NLS hierarchy; Inverse scattering; Riemann-Hilbert problem; Nonzero boundary conditions; N-triple-pole solitons and breathers
资金
- National Natural Science Foundation of China [11731014, 11925108]
Based on the matrix Riemann-Hilbert problem, the inverse scattering transform for the focusing nonlinear Schrodinger equation with triple zeros of scattering coefficients is presented. General N-triple-pole solutions for the potential and explicit expressions for the reflectionless potential are found, along with trace formulae and theta conditions. The obtained triple-pole solutions are useful for explaining related nonlinear wave phenomena.
Based on the matrix Riemann-Hilbert problem we present the inverse scattering transform for the focusing nonlinear Schrodinger (NLS) equation with nonzero boundary conditions (NZBCs) at infinity and triple zerosof analytical scattering coefficients. As a consequence, the inverse scattering problem can be solved via the study of the matrix Riemann-Hilbert problem with triple poles. We find the general Ntriple-pole solutions for the potential, and explicit N-triple-pole expression for the reflectionless potential in terms of two determinants. Besides, the trace formulae and theta conditions are also given. Finally, we discuss the one-triple-pole breather-breather-breather solution for the focusing NLS equation with NZBCs. Moreover, the general N-triple-pole breathers of NZBCs can reduce to general N-triple-pole solitons of the zero-boundary conditions. These results can also be extended to the focusing higher-order NLS equations (i.e., the NLS hierarchy such as the Hirota equation, complex mKdV equation, Lakshmanan-Porsezian-Daniel equation, complex fifth-order mKdV equation, fifth-, sixth-, and seventh-order NLS equations, etc.) with NZBCs to find their inverse scattering transforms (ISTs) and N-triple-pole solutions. These obtained triple-pole solutions are useful to explain the related nonlinear wave phenomena. (C) 2021 Elsevier B.V. All rights reserved.
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