Journal ArticleDOI
Transformation of multipole and vortex solitons in the nonlocal nonlinear fractional Schrödinger equation by means of Lévy-index management
Qing Wang,Ming Zhang,Boris A. Malomed,Dumitru Mihalache,Liangwei Zeng +4 more
- Vol. 157, pp 111995-111995
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In this article , the structure and stability of multipole and vortex solitons in the nonlocal nonlinear fractional Schrödinger equation with a gradually decreasing Lévy index, α, are numerically studied.Abstract:
The structure and stability of multipole and vortex solitons in the nonlocal nonlinear fractional Schrödinger equation with a gradually decreasing Lévy index, α, are numerically studied. It is found that the solitons adiabatically compress with the decrease of Lévy index, and new species of stable ones are produced by means of this technique. It is known that, under the action of the normal diffraction (α = 2), the nonlocal cubic self-trapping can support, at most, quadrupole solitons and vortex ones with winding number m = 2 as stable modes in the one- and two-dimensional space, respectively. In contrast to that, we find that the application of the Lévy index management (the gradual decrease of α) leads to the formation of stable five-poles and sextupoles in one-dimensional, and vortices with m = 3 in two-dimensional. Weak dissipation does not essentially affect the observed results. read more
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Journal ArticleDOI
Collision dynamics of three-solitons in an optical communication system with third-order dispersion and nonlinearity
Journal ArticleDOI
Optical soliton solutions to the fractional nonlinear Fokas–Lenells and paraxial Schrödinger equations
Journal ArticleDOI
Construction cubic-quartic solitons in optical metamaterials for the perturbed twin-core couplers with Kudryashov's sextic power law using extended F-expansion method
Wafaa B. Rabie,Hamdy M. Ahmed +1 more
TL;DR: In this paper , the twin-core couplers with Kudryashov's sextic power law of refractive index and perturbation terms were considered and the extended F-expansion method was implemented to construct cubic-quartic solitons in optical metamaterials and other solutions for the proposed model.
Journal ArticleDOI
Pure-quartic solitons in presence of weak nonlocality
TL;DR: In this paper , a nonlinear Schrödinger equation incorporating pure fourth-order diffraction, Kerr nonlinearity and weak nonlocality was proposed to describe the transmission of solitons in the system, and analytic pure-quartic soliton solutions to this model were obtained in a variety of shapes and forms.
Journal ArticleDOI
Chirped Lommel Gaussian vortex beams in strongly nonlocal nonlinear fractional Schrödinger equations
TL;DR: In this paper , the effect of the Lévy index of fractional diffraction effect in strongly nonlocal nonlinear fractional Schrödinger equation (NFSE) was studied for the first time.
References
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