Investigating Families of Soliton Solutions for the Complex Structured Coupled Fractional Biswas–Arshed Model in Birefringent Fibers Using a Novel Analytical Technique

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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.

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

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“…Classical derivatives have a local character, allowing us to evaluate changes in the vicinity of a point, whereas Caputo fractional derivatives have a nonlocal nature, allowing us to analyze changes in an interval. This trait makes the Caputo fractional derivative applicable to modeling a wider variety of physical phenomena, including ocean climate, atmospheric physics, dynamical systems, earthquakes, vibrations, polymers, etc (refer to the scholarly literature cited in [13][14][15][16][17][18] for additional details).…”

Section: Introductionmentioning

confidence: 99%

An efficient semi-analytical techniques for the fractional-order system of Drinfeld-Sokolov-Wilson equation

Hamid Ganie,

Yasmin,

Alderremy

et al. 2024

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This study delves into the exploration and analysis of the fractional order Drinfeld-Sokolov-Wilson (FDSW) system within the framework of the Caputo operator. To address this complex system, two innovative methods, namely the Aboodh transform iteration method (ATIM) and the Aboodh residual power series method (ARPSM), are introduced and applied. These methods offer efficient computational tools to investigate the FDSW system, particularly in the fractional order context utilizing the Caputo operator. The ATIM and ARPSM are employed to solve and analyze the FDSW system, allowing for the derivation of solutions and insights into the system’s behavior and dynamics. The utilization of these novel methods showcases their efficacy in handling the intricate characteristics of the FDSW system under fractional differentiation, offering a deeper understanding of its mathematical properties and behaviors.

“…Notably, the FIM techniquebased presentation of precise solutions for these models represents a novel contribution that has not before been mentioned in the literature. The creation of soliton solutions for FPDEs is made possible by m-EDAM, an improved version of EDAM that researchers use [38,39]. In this method, a wave transformation is used to convert the FPDE into a nonlinear ODEs.…”

Section: Introductionmentioning

confidence: 99%

Study of traveling soliton and fronts phenomena in fractional Kolmogorov-Petrovskii-Piskunov equation

Ullah,

Shah,

Abdeljawad

2024

The present research work presents the modified Extended Direct Algebraic Method (m-EDAM) to construct and analyze propagating soliton solutions for fractional Kolmogorov-Petrovskii-Piskunov Equation (FKPPE) which incorporates Caputo's fractional derivatives. The FKPPE has significance in various disciplines such as population growth, reaction-diffusion mechanisms, and mathematical biology. By leveraging the series form solution, the proposed m-EDAM determines plethora of travelling soliton solutions through the transformation of FKPPE into Nonlinear Ordinary Differential Equation (NODE). These soliton solutions shed light on propagation processes in the framework of the FKPPE model. Our study also offers some graphical representations that facilitate the characterization and investigation of propagation processes of the obtained soliton solutions which include kink, shock soliton solutions. Our work advances our understanding of complicated phenomena across multiple academic disciplines by fusing insights from mathematical biology and reaction-diffusion mechanisms.