Soliton solutions of an integrable nonlinear Schrödinger equation with quintic terms
Date
2014-09-26
Authors
Chowdury, A.
Kedziora, D. J.
Ankiewicz, A.
Akhmediev, N.
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Publisher
American Physical Society
Abstract
We present the fifth-order equation of the nonlinear Schrodinger hierarchy. This integrable partial differential ¨
equation contains fifth-order dispersion and nonlinear terms related to it. We present the Lax pair and use
Darboux transformations to derive exact expressions for the most representative soliton solutions. This set
includes two-soliton collisions and the degenerate case of the two-soliton solution, as well as beating structures
composed of two or three solitons. Ultimately, the new quintic operator and the terms it adds to the standard
nonlinear Schrodinger equation (NLSE) are found to primarily affect the velocity of solutions, with complicated ¨
flow-on effects. Furthermore, we present a new structure, composed of coincident equal-amplitude solitons,
which cannot exist for the standard NLSE.
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Source
Physical Review E
Type
Journal article