A fast collocation method for solving the weakly singular fractional integro-differential equation

被引：0

作者：

M. Taghipour

H. Aminikhah

机构：

[1] University of Guilan,Department of Applied Mathematics and Computer Science, Faculty of Mathematical Sciences

[2] University of Guilan,Center of Excellence for Mathematical Modelling, Optimization and Combinational Computing (MMOCC)

来源：

Computational and Applied Mathematics | 2022年 / 41卷

关键词：

Time fractional partial integro-differential equation; Weakly singular kernel; Pell polynomials; Spectral collocation method; Caputo fractional derivative of variable order; Convergence analysis; 65M70; 65R10; 34K37; 45J05;

D O I：

暂无

中图分类号：

学科分类号：

摘要：

In the present paper, we propose a spectral collocation method based on Pell polynomials to obtain the solution of a variable-order fractional integro-differential equation with a weakly singular kernel. Fractional integro-differential equations are used in many mathematical models, including heat conduction in memory materials, nuclear reactor dynamics, and chemical kinetics. To provide a numerical scheme, we consider Pell polynomials and use operational matrices to approximate variable-order Caputo fractional derivative as well as integral terms in the main equation. A linear system of equations is formed by collocating the resulting approximate equations. The existence and uniqueness of the solution to the main equation have been proved. The convergence of the approximation solution has been discussed. Several test problems are reported to demonstrate the validity of the method.

引用

共 50 条

[1] A fast collocation method for solving the weakly singular fractional integro-differential equation
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[J]. COMPUTATIONAL & APPLIED MATHEMATICS, 2022, 41 (04):
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[6] Pell Collocation Method for Solving the Nonlinear Time-Fractional Partial Integro-Differential Equation with a Weakly Singular Kernel
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