Journal
NONLINEAR DYNAMICS
Volume 99, Issue 2, Pages 1295-1300Publisher
SPRINGER
DOI: 10.1007/s11071-019-05354-2
Keywords
Nonlocal nonlinear equations; Lax pair; Darboux transformation; PT; documentclass[12pt]{minimal}; usepackage{amsmath}; usepackage{wasysym}; usepackage{amsfonts}; usepackage{amssymb}; usepackage{amsbsy}; usepackage{mathrsfs}; usepackage{upgreek}; setlength{; oddsidemargin}{-69pt}; begin{document}$$; mathcal {P}; mathcal {T}$$; end{document} symmetry; Soliton
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We consider the fourth-order nonlocal nonlinear Schrodinger equation and generate the Lax pair. We then employ Darboux transformation to generate dark and antidark soliton solutions. The highlight of the results is that one ends up generating a two-soliton solution characterized by one spectral parameter alone, a property which has never been witnessed so far.
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