Analytical solution to the spatial optical solitons propagating in the strong nonlocal media | Zendy

Xiaping Zhang | Zendy; Qi Guo | Zendy; Weibing Hu | Zendy

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Analytical solution to the spatial optical solitons propagating in the strong nonlocal media

Author(s) -

Xiaping Zhang,

Qi Guo,

Weibing Hu

Publication year - 2005

Publication title -

acta physica sinica

Language(s) - English

Resource type - Journals

SCImago Journal Rank - 0.199

H-Index - 47

ISSN - 1000-3290

DOI - 10.7498/aps.54.5189

Subject(s) - physics , soliton , gaussian , nonlinear system , gaussian beam , laguerre polynomials , power (physics) , beam (structure) , order (exchange) , ring (chemistry) , light beam , optics , classical mechanics , quantum mechanics , chemistry , organic chemistry , finance , economics

This paper discusses the optical beam (1+2D) of suitable input power propagating in the strong nolocal nonlinear media,which is governed by the Snyder-Mitchell model in the cylindrical coordinate.An exact analytical solution in Laguerre-Gaussian form is obtained.It is shown that the solution in the Gaussian form is the lowest-order mode.It is found for the first time that the necklace-ring spatial soliton exists in the strong nonlocal media.

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