Roy, Samudra and Bhadra, Shyamal Kumar (2008) Solving soliton perturbation problems by introducing Rayleigh's dissipation function. Journal of Lightwave Technology, 26 (13-16). pp. 2301-2322. ISSN 0733-8724

[img] PDF - Published Version
Restricted to Registered users only

Download (882Kb) | Request a copy

Abstract

We solve soliton perturbation problem in nonlinear optical system by introducing Rayleigh's dissipation function in the framework of variational approach. The adopted process facilitates variational approach to be applied on dissipative system where the Lagrangian and Hamiltonian are difficult to form. Exploiting the idea, loss and filtering problems are evaluated with convincing results. Considering other perturbing terms like two soliton interactions, intrapulse Raman scattering, self-steepening, and two-photon absorption in extended nonlinear Schrodinger equation, Rayleigh's dissipation function is configured intuitively so that the generalized Euler-Lagrange equation converges to the related governing equation of the pulse propagation. The process evolves a set of differential equations exploiting the dynamics of different pulse parameters under the influence of perturbations. The obtained analytical results are verified with generalized Kantorovich approach and compared with previous reported results. Numerical simulations based on the split-step beam propagation method are employed to calculate the pulse evolution parameters and the derived results are found to be corroborated well with the analytical predictions.

Item Type: Article
Uncontrolled Keywords: Filters and modulators; generalized Euler-Lagrange equation; intrapulse Raman scattering; optical soliton; Rayleigh's dissipation function; self-steepening; soliton interaction; timing-jitter; two-photon absorption (TPA)
Subjects: Processing Science
Divisions: Fiber Optics and Photonics
Depositing User: Bula Ghosh
Date Deposited: 20 Jan 2012 05:22
Last Modified: 22 Nov 2012 07:14
URI: http://cgcri.csircentral.net/id/eprint/404

Actions (login required)

View Item View Item