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New computational optical solitons for generalized complex Ginzburg–Landau equation by collective variables

Nauman Raza, Nahal Jannat, J. F. Gómez‐Aguilar, Eduardo Pérez‐Careta

2022Modern Physics Letters B20 citationsDOI

Abstract

The purpose of the paper is to implement the collective variable method to investigate the generalized complex Ginzburg–Landau equation, which characterizes the kinetics of solitons in respect of pulse parameters for fiber optics. The statistical simulations of the interacting system of ordinary differential equations that reflect all the collective variables included in the pulse ansatz have been successfully carried out using a well-known numerical methodology, the fourth-order Runge–Kutta technique. The collective variable method is employed to plot the pulse variation characteristics as a function of propagation distance. The amplitude, temporal position, width, chirp, frequency, and phase of the pulse are all depicted against the propagated coordinate, where the width, phase of soliton, amplitude, and chirp all show a strong periodicity. The numerical dynamics of solitons have also been exhibited against varying values of pulse parameters to highlight differences in collective variables. Other key bits of the current investigation are also determined.

Topics & Concepts

AnsatzChirpPhysicsPulse (music)AmplitudeOrdinary differential equationSolitonPosition (finance)Function (biology)Statistical physicsPhase (matter)Variable (mathematics)Differential equationMathematical analysisClassical mechanicsMathematicsQuantum mechanicsNonlinear systemEconomicsEvolutionary biologyVoltageBiologyLaserFinanceNonlinear Photonic SystemsAdvanced Fiber Laser TechnologiesNonlinear Dynamics and Pattern Formation
New computational optical solitons for generalized complex Ginzburg–Landau equation by collective variables | Litcius