Special Issue: Galerkin, Tau, Collocation, Finite Difference, and Finite Volume Methods for Differential, Integral, and Fractional Equations

Overview

 

This Special Issue aims to provide a focused platform for high-quality mathematical research that advances theoretical foundations, numerical analysis, and computational methodologies based on Galerkin, tau, collocation, finite difference, and finite volume approaches for the numerical treatment of differential and integral models. The issue seeks to bridge rigorous mathematical analysis with practical algorithms for solving ordinary and partial differential equations, integral and integro-differential equations, and fractional differential equations. Emphasis is placed on accuracy, stability, convergence, and efficiency, as well as on the ability of these methods to address nonlocal effects, complex boundary conditions, and multiscale phenomena that arise in contemporary applications.

 

Scope of the Special Issue

 

We welcome submissions in (but not limited to) the following areas:

- Galerkin and tau methods for ordinary, partial, and fractional differential equations

-Collocation methods for differential, integral, and integro-differential equations

-Finite difference and finite volume schemes for linear and nonlinear boundary value problems

-Numerical methods for integral equations and integro-differential equations

-Computational and analytical aspects of fractional differential and partial differential equations

 

Guest Editor

 

Lead Editor:           Prof. Youssri Hassan Youssri, youssri@cu.edu.eg   

                                 Department of Mathematics, Faculty of Science,

                                 Cairo University,

                                 Giza, 12613,

                                 Egypt

 

 

Submissions should present original and high-quality research that is not currently under review elsewhere. All manuscripts will undergo a rigorous double-blind peer review process. Previously published conference papers must be substantially extended and clearly identified during submission.

 

 

Submission Information

Submit it online: http://ojs.wiserpub.com/index.php/CM/user/register

Or send it to the email address: garyli@wiserpub.com

 

 

Submission Guideline

https://ojs.wiserpub.com/index.php/CM/about/submissions

For any inquiries about this Special Issue, please contact the Editors via garyli@wiserpub.com