Journal
OPTIK
Volume 243, Issue -, Pages -Publisher
ELSEVIER GMBH
DOI: 10.1016/j.ijleo.2021.166723
Keywords
Solitons; Kudryashov; Integrability; Waves; Non-Kerr law
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This paper explores soliton solutions to the nonlinear Schrodinger equation with Kudryashov's arbitrary form of refractive index and two forms of nonlocal nonlinear forms, obtaining a complete spectrum of soliton solutions through modified Kudryashov's method and an addendum. The criteria for the existence of such solitons are also outlined.
The current paper obtains soliton solutions to the governing nonlinear Schro center dot dinger's equation that is considered with Kudryashov's arbitrary form of refractive index along with two forms of nonlocal nonlinear forms of nonlinearity. A complete spectrum of soliton solutions has been recovered. This is accomplished by the aid of modified Kudryashov's method together with an addendum to it. The existence criteria for such solitons are also enumerated.
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