Fractional Calculus and Applications: ICFCA 2024, Sousse, Tunisia, December 26-30
This proceedings volume convenes works within the field of fractional calculus and its applications, presented at the International Conference on Fractional Differentiation and its Applications (ICFCA), held in Sousse, Tunisia, from December 26th to 30th, 2024.

In its first rendition, the ICFCA gathers papers from several countries such as Algeria, Lebanon, Qatar, Tunisia, Türkiye, and United Arab Emirates, among others. It aims to provide a unique platform for researchers engaged in fractional calculus in a mathematical context. Covered topics range from foundational aspects, such as fractional differential equations, stability analysis, boundary value problems, and inverse problems, to more applied aspects such as fractional control systems, and the use of fractional calculus tools and techniques in physics, engineering, biology, and more.

This volume fills a gap in the fractional calculus landscape by covering theoretical developments and applications in various fields while showcasing the recent findings of a new generation of researchers.

1147389565
Fractional Calculus and Applications: ICFCA 2024, Sousse, Tunisia, December 26-30
This proceedings volume convenes works within the field of fractional calculus and its applications, presented at the International Conference on Fractional Differentiation and its Applications (ICFCA), held in Sousse, Tunisia, from December 26th to 30th, 2024.

In its first rendition, the ICFCA gathers papers from several countries such as Algeria, Lebanon, Qatar, Tunisia, Türkiye, and United Arab Emirates, among others. It aims to provide a unique platform for researchers engaged in fractional calculus in a mathematical context. Covered topics range from foundational aspects, such as fractional differential equations, stability analysis, boundary value problems, and inverse problems, to more applied aspects such as fractional control systems, and the use of fractional calculus tools and techniques in physics, engineering, biology, and more.

This volume fills a gap in the fractional calculus landscape by covering theoretical developments and applications in various fields while showcasing the recent findings of a new generation of researchers.

219.99 Pre Order
Fractional Calculus and Applications: ICFCA 2024, Sousse, Tunisia, December 26-30

Fractional Calculus and Applications: ICFCA 2024, Sousse, Tunisia, December 26-30

Fractional Calculus and Applications: ICFCA 2024, Sousse, Tunisia, December 26-30

Fractional Calculus and Applications: ICFCA 2024, Sousse, Tunisia, December 26-30

Overview

This proceedings volume convenes works within the field of fractional calculus and its applications, presented at the International Conference on Fractional Differentiation and its Applications (ICFCA), held in Sousse, Tunisia, from December 26th to 30th, 2024.

In its first rendition, the ICFCA gathers papers from several countries such as Algeria, Lebanon, Qatar, Tunisia, Türkiye, and United Arab Emirates, among others. It aims to provide a unique platform for researchers engaged in fractional calculus in a mathematical context. Covered topics range from foundational aspects, such as fractional differential equations, stability analysis, boundary value problems, and inverse problems, to more applied aspects such as fractional control systems, and the use of fractional calculus tools and techniques in physics, engineering, biology, and more.

This volume fills a gap in the fractional calculus landscape by covering theoretical developments and applications in various fields while showcasing the recent findings of a new generation of researchers.

Product Details

ISBN-13: 9783031953804
Publisher: Springer Nature Switzerland
Publication date: 09/14/2025
Series: Springer Proceedings in Mathematics & Statistics , #505
Pages: 248
Product dimensions: 6.10(w) x 9.25(h) x (d)

About the Author

Omar Naifar completed a Master's degree in Computer Science from the Faculty of Sciences of Sfax at the University of Sfax, Tunisia, in 2010. He pursued a Master's project in Automatic and Industrial Computing from the National School of Engineering of Sfax in 2012, followed by a PhD in Electrical Engineering in 2015. Subsequently, he obtained the HdR degree in Electrical Engineering from the same institute in 2021. He currently serves as an Associate Professor at the Higher Institute of Applied Sciences and Technology of Kairouan. His research interests encompass robust nonlinear control, theoretical aspects of nonlinear observer design, control and fault diagnosis, and fractional-order control systems.

Abdellatif Ben Makhlouf earned both a Master's degree and a PhD in Mathematics from the University of Sfax, Tunisia, in 2015. Presently, he holds the position of Associate Professor at the University of Sfax. His research pursuits encompass fractional differential equations, ordinary differential equations, shastic differential equations, control theory, and stability theory.

Mohamed Ali Hammami achieved his PhD degree in Mathematics in 1994 from the University of Metz (France) and the "Habilitation" in 2001 from the University of Sfax (Tunisia). He currently serves as a Professor at the Faculty of Sciences of Sfax in the Department of Mathematics, particularly affiliated with the Stability and Control Systems and Nonlinear PDE Laboratory. His research interests encompass nonlinear control systems and differential equations, focusing on the stability of time-varying systems, stabilization of impulsive, time-delay, and fuzzy systems, shastic evolution systems, observability and observer, and differential equations.

Table of Contents

- The Fractional-Order Selkov-Schnakenberg Reaction-Diffusion model: Stability and Numerical simulations (Iqbal H. Jebril, Issam Bendib, Adel Ouannas, Salah Boulaaras, Iqbal M. Batiha and Shaher Momani).- Finite-Time Stability Analysis of Reaction-Diffusion Systems with Fractional-Order Dynamics: A Study Using the Selkov-Schnakenberg Model (Issam Bendib, Adel Ouannas, Shaher Momani and Chaouki Aouiti).- Global Stability Analysis of Fractional Selkov-Schnakenberg Reaction-Diffusion Systems (Iqbal H. Jebril, Issam Bendib, Adel Ouannas, Salah Boulaaras, Iqbal M. Batiha and Shaher Momani).- Dynamics in Finite-Time of the Fractional-Order FitzHugh-Nagumo model: stability, synchronization, and simulations (Issam Bendib, Adel Ouannas, Mohammed Al Horani and Mohamed Dalah).- On Fractional Variable-Order Neural Networks under Atangana-Baleanu-Caputo Derivative (Ma’mon Abu Hammad, Amel Hioual, Adel Ouannas, Shaher Momani and Zohir Dibi).- Blow up solutions for a variant of the Cahn-Hilliard equation describing growth of cancerous cells (Hussein Fakih, Salam Abou Baraki, Ragheb Mghames and Yahia Awad).- A New Fractional Discrete Memristive Map with Incommensurate Order and Hidden Dynamics (Imane Zouak, Adel Ouannas and Amina-Aicha Khennaoui).- Qualitative Analysis and Hopf bifurcation for a fractional order ratio-dependent prey-predator model (Canan Celik and Kübra Değerli).- Hidden Chaos in new Fractional Sigmoidal-Based Quadratic Memristive Map (Louiza Diabi and Adel Ouannas).- Stability Investigation of Nonlinear Fractional Difference Equations with Incommensurate Orders (Noureddine Djenina, Adel Ouannas, Shaher Momani and Giuseppe Grassi).- Resolvent operator approach for solving some fractional abstract Volterra-Fredholm integro-differential equations with deviated argument (Fatiha Boutaous).- Sequential Bayesian A-Optimal Sampling Locations for Fractional Partial Differential Equations (Ryad Ghanam and Edward L. Boone).- On the Solutions of Two-Point Nonlinear Fractional Differential Equations with Multiple Fractional Boundary Conditions (Yahia Awad, Hussein Fakih, Karim Amin and Ragheb Mghames).- Some new Chebyshev and Grüss-type fractional inequalities obtained by a generalized fractional integral operator (Mustafa Gürbüz and Çağrı Aşak).- Regularity of Solutions for a Class of Neutral Fractional Shastic Differential Equations (Jihen Sallay).- The Lindley q-Distribution: Development, Properties, and Statistical Applications (Bouzida Imed and Zitouni Mouna).

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Science & Technology
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Mathematics
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Mathematical Equations - Differential

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