Assorted optical soliton solutions of the nonlinear fractional model in optical fibers possessing beta derivative

Islam, M Nurul; Al-Amin, M; Akbar, M Ali; Wazwaz, Abdul-Majid; Osman, M S

doi:10.1088/1402-4896/ad1455

Cited by 11 publications

(4 citation statements)

References 53 publications

(68 reference statements)

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“…The solution to Eq. ( 1) is obtained by following the solution structure presented in references [46][47][48][49][50][51][52][53]:…”

Section: Application To the Concatenation Modelmentioning

confidence: 99%

Stochastic Perturbation of Optical Solitons for the Concatenation Model with Power-Law of Self-Phase Modulation Having Multiplicative White Noise

Arnous,

Biswas,

Yildirim

et al. 2024

Contemp. Math.

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Addressing the concatenation model, this paper explores the incorporation of power-law self-phase modulation and spatio-temporal dispersion, in addition to the chromatic dispersion. The inclusion of the white noise effect, along with deterministic Hamiltonian perturbation terms of arbitrary intensity, is also examined. Two integration approaches are applied to recover the soliton solutions, leading to the observation that the white noise effect remains confined to the phase component of these solutions.

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“…The solution to Eq. ( 1) is obtained by following the solution structure presented in references [46][47][48][49][50][51][52][53]:…”

Section: Application To the Concatenation Modelmentioning

confidence: 99%

Stochastic Perturbation of Optical Solitons for the Concatenation Model with Power-Law of Self-Phase Modulation Having Multiplicative White Noise

Arnous,

Biswas,

Yildirim

et al. 2024

Contemp. Math.

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“…The paper utilizes the increasingly popular fractional β-derivative, capable of modeling phenomena beyond the scope of integer-order derivatives. Using a sophisticated analytical technique called the generalized (G ′ /G) expansion approach, the authors present various soliton solutions [58].…”

Section: Applications In Nonlinear Opticsmentioning

confidence: 99%

Modeling Wave Packet Dynamics and Exploring Applications: A Comprehensive Guide to the Nonlinear Schrödinger Equation

Karjanto

2024

Mathematics

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The nonlinear Schrödinger (NLS) equation stands as a cornerstone model for exploring the intricate behavior of weakly nonlinear, quasi-monochromatic wave packets in dispersive media. Its reach extends across diverse physical domains, from surface gravity waves to the captivating realm of Bose–Einstein condensates. This article delves into the dual facets of the NLS equation: its capacity for modeling wave packet dynamics and its remarkable breadth of applications. We illuminate the derivation of the NLS equation through both heuristic and multiple-scale approaches, underscoring how distinct interpretations of physical variables and governing equations give rise to varied wave packet dynamics and tailored values for dispersive and nonlinear coefficients. To showcase its versatility, we present an overview of the NLS equation’s compelling applications in four research frontiers: nonlinear optics, surface gravity waves, superconductivity, and Bose–Einstein condensates. This exploration reveals the NLS equation as a powerful tool for unifying and understanding a vast spectrum of physical phenomena.

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“…On the other hand, analytical techniques offer the advantage of delivering exact or closed-form solutions, enabling a more thorough comprehension of the underlying mechanisms and providing efficient and exact analysis of FPDEs. To get exact solutions for nonlinear FPDEs, different analytical methods are used, including the Khater Method [15], the Exp-function method [16], the (G'/G)-expansion method [17], EDAM [18] and many other techniques [19][20][21][22][23][24][25].…”

Section: Introductionmentioning

confidence: 99%

On the optical soliton solutions to the fractional complex structured (1+1)-dimensional perturbed gerdjikov-ivanov equation

El-Tantawy,

Alyousef,

Matoog

et al. 2024

Phys. Scr.

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In this work, we examine the complex structured Fractional Perturbed Gerdjikov-Ivanov Equation (FPGIE), which describes the propagation of optical pulses with perturbation effects. This model finds applications in optical fibers, especially in photonic crystal fibers. We are discovered novel and unique optical soliton solutions using the modified Extended Direct Algebraic Method (mEDAM), which has never been used with this model previously. As a result, a hierarchy of traveling wave solutions incuding singular kink, periodic, solitary kink, and rogue-shaped soliton solutions,etc., are derived. Some obtained solutions are discussed graphically based on numerical values of some parameters related to the solution. The results add new and unique soliton types to the model and demonstrate how they interact and impact the system's overall dynamics.

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Assorted optical soliton solutions of the nonlinear fractional model in optical fibers possessing beta derivative

Cited by 11 publications

References 53 publications

Stochastic Perturbation of Optical Solitons for the Concatenation Model with Power-Law of Self-Phase Modulation Having Multiplicative White Noise

Stochastic Perturbation of Optical Solitons for the Concatenation Model with Power-Law of Self-Phase Modulation Having Multiplicative White Noise

Modeling Wave Packet Dynamics and Exploring Applications: A Comprehensive Guide to the Nonlinear Schrödinger Equation

On the optical soliton solutions to the fractional complex structured (1+1)-dimensional perturbed gerdjikov-ivanov equation

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