An Efficient Hybrid Method and Its Convergence Analysis for Solving Volterra Integro-Differential Equations with Fractional Order

被引：0

作者：

Hesameddini, Esmail ^{[1
]}

Rahimi, Azam ^{[1
]}

机构：

[1] Shiraz Univ Technol, Dept Math, POB 71555-313, Shiraz, Iran

来源：

IRANIAN JOURNAL OF SCIENCE AND TECHNOLOGY TRANSACTION A-SCIENCE | 2019年 / 43卷 / A2期

关键词：

Fractional Volterra integro-differential equations; Reconstruction of variational iteration method; Stability; Convergence; POPULATION-GROWTH MODEL; APPROXIMATION;

D O I：

10.1007/s40995-017-0401-z

中图分类号：

O [数理科学和化学]; P [天文学、地球科学]; Q [生物科学]; N [自然科学总论];

学科分类号：

07 ; 0710 ; 09 ;

摘要：

In this paper, we apply an efficient hybrid method for solving the fractional Volterra integro-differential equations. The method is based upon hybrid approach consisting a coupling of variational iteration method and Laplace transform. This work extends and applied a novel and simple method to obtain rigorously reliable and accurate results. The stability and convergence of presented method are analyzed by some theorems. Also, several numerical examples are carried out to confirm the validity and efficiency of proposed approach. Moreover, the fractional Volterra population growth model is considered by our method as an application.

引用

页码：555 / 565

页数：11

共 50 条

[41] CONVERGENCE ANALYSIS OF THE SINC COLLOCATION METHOD FOR INTEGRO-DIFFERENTIAL EQUATIONS SYSTEM [J].

Zarebnia, Mohammad .

SAHAND COMMUNICATIONS IN MATHEMATICAL ANALYSIS, 2016, 4 (01) :29-42

[42] Numerical analysis of the balanced methods for stochastic Volterra integro-differential equations [J].

Hu, Lin ;

Chan, Aining ;

Bao, Xuezhong .

COMPUTATIONAL & APPLIED MATHEMATICS, 2021, 40 (06)

[43] A COLLOCATION METHOD FOR SOLVING NONLINEAR VOLTERRA INTEGRO-DIFFERENTIAL EQUATIONS OF NEUTRAL TYPE BY SIGMOIDAL FUNCTIONS [J].

Costarelli, Danilo ;

Spigler, Renato .

JOURNAL OF INTEGRAL EQUATIONS AND APPLICATIONS, 2014, 26 (01) :15-52

[44] Numerical solution of fractional Volterra integro-differential equations using flatlet oblique multiwavelets [J].

Shafinejhad, Zahra ;

Zarebnia, Mohammad .

COMPUTATIONAL METHODS FOR DIFFERENTIAL EQUATIONS, 2024, 12 (02) :374-391

[45] Optimal Convergence Rate of θ-Maruyama Method for Stochastic Volterra Integro-Differential Equations with Riemann-Liouville Fractional Brownian Motion [J].

Wang, Mengjie ;

Dai, Xinjie ;

Xiao, Aiguo .

ADVANCES IN APPLIED MATHEMATICS AND MECHANICS, 2022, 14 (01) :202-217

[46] A Tau-like numerical method for solving fractional delay integro-differential equations [J].

Shahmorad, Sedaghat ;

Ostadzad, M. H. ;

Baleanu, D. .

APPLIED NUMERICAL MATHEMATICS, 2020, 151 :322-336

[47] On the convergence of Galerkin methods for auto-convolution Volterra integro-differential equations [J].

Li, Yuping ;

Liang, Hui ;

Yuan, Huifang .

NUMERICAL ALGORITHMS, 2024, :183-205

[48] Laguerre approach for solving pantograph-type Volterra integro-differential equations [J].

Yuzbasi, Suayip .

APPLIED MATHEMATICS AND COMPUTATION, 2014, 232 :1183-1199

[49] On the Optimal Control of Volterra Integro-Differential Equations [J].

Azhmyakov, Vadim ;

Egerstedt, Magnus ;

Verriest, Erik I. .

2019 IEEE 58TH CONFERENCE ON DECISION AND CONTROL (CDC), 2019, :3340-3345

[50] Stability of a system of Volterra integro-differential equations [J].

Vanualailai, J ;

Nakagiri, S .

JOURNAL OF MATHEMATICAL ANALYSIS AND APPLICATIONS, 2003, 281 (02) :602-619

← 1 2 3 4 5 →