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Novel optical waves for the perturbed nonlinear Chen-Lee-Liu equation with variable coefficients using two different similarity techniques

Rehab M. El‐Shiekh, Mahmoud Gaballah

2023Alexandria Engineering Journal15 citationsDOIOpen Access PDF

Abstract

In this paper, a new extension of the perturbed nonlinear Chen-Lee-Liu equation as a variable coefficients model represents optical pulse propagation in a monomode fiber is studied. The direct similarity reduction method is used to transform the Chen-Lee-Liu model with variable coefficients to a nonlinear ordinary differential equation and the Jacobi elliptic expansion method is used to solve the reduced equation and as a result, novel optical solitons, periodic, and singular waves have arisen. Then, to prove the physical existence and importance of the presented variable coefficients Chen-Lee-Liu model, another similarity technique is used to transform the Chen-Lee-Liu model to the generalized derivative Schrödinger equation which has known bright and dark soliton solutions. Finally, a graphical representation of the obtained wave solutions according to different structures of the variable coefficients is presented.

Topics & Concepts

ChenSimilarity (geometry)MathematicsVariable (mathematics)Mathematical analysisNonlinear systemSolitonMatrix similarityPartial differential equationOrdinary differential equationApplied mathematicsDifferential equationPhysicsQuantum mechanicsComputer scienceBiologyImage (mathematics)Artificial intelligencePaleontologyNonlinear Waves and SolitonsNonlinear Photonic SystemsAdvanced Fiber Laser Technologies
Novel optical waves for the perturbed nonlinear Chen-Lee-Liu equation with variable coefficients using two different similarity techniques | Litcius