Some computational convergent iterative algorithms to solve nonlinear problems

被引：12

作者：

Rabbani, Mohsen ^{[1
]}

He, Ji Huan ^{[2
,3
,4
]}

Duz, Murat ^{[5
]}

机构：

[1] Islamic Azad Univ, Dept Appl Math, Sari Branch, Sari, Iran

[2] Henan Polytech Univ, Sch Math & Informat Sci, Jiaozuo, Henan, Peoples R China

[3] Xian Univ Architecture & Technol, Sch Sci, Xian, Peoples R China

[4] Soochow Univ, Coll Text & Clothing Engn, Natl Engn Lab Modern Silk, 199 Ren Ai Rd, Suzhou, Peoples R China

[5] Karabuk Univ, Dept Math, Fac Sci, Karabuk, Turkey

来源：

MATHEMATICAL SCIENCES | 2023年 / 17卷 / 02期

关键词：

Iterative algorithms; Modified homotopy; Adomian polynomials; Ordinary differential equations (ODE); Partial differential equations (PDE); KdV equation; HOMOTOPY PERTURBATION METHOD; DE-VRIES-EQUATION; TRANSFORM;

D O I：

10.1007/s40096-021-00448-8

中图分类号：

O29 [应用数学];

学科分类号：

070104 ;

摘要：

In this article, we apply Fourier transform to convert a nonlinear problem to a suitable equation and then we introduce a modified homotopy perturbation to divide the above equation into some smaller and easier equations. These equations can be solved by some iterative algorithms which are constructed by modified homotopy perturbation and Adomian polynomials. As an example, we use the iterative algorithms to find the exact solution of nonlinear ordinary and partial differential equations (in abbreviated form, ODE and PDE). To show ability and validity of the presented algorithms, we solve Korteweg-de Vries (KdV) equation to approximate the exact solution with a high accuracy. Furthermore, a discussion is presented herein about the convergence of the proposed algorithms in Banach space

引用

页码：145 / 156

页数：12

共 33 条

[1]

Abdou M.A., 2011, INT J NONLIN SCI NUM, V12, P29

[2]

Acan O., 2016, J COMPUT THEOR NANOS, V13, P8800, DOI DOI 10.1166/JCTN.2016.6044

[3]

Acan O., 2017, NEW TRENDS MATH SCI, V1, P164, DOI [10.20852/ntmsci.2017.134, DOI 10.20852/NTMSCI.2017.134]

[4]

Adomian G., 1994, SOLVING FRONTIER PRO, DOI [10.1007/978-94-015-8289-6, DOI 10.1007/978-94-015-8289-6]

[5] Computing the Fourier Transform via Homotopy Perturbation Method [J].

Babolian, Esmail ;

Saeidian, Jamshid ;

Paripour, Mahmood .

ZEITSCHRIFT FUR NATURFORSCHUNG SECTION A-A JOURNAL OF PHYSICAL SCIENCES, 2009, 64 (11) :671-675

[6] The solution of two dimensional nonlinear differential equation by the Adomian decomposition method [J].

Bildik, N ;

Bayramoglu, H .

APPLIED MATHEMATICS AND COMPUTATION, 2005, 163 (02) :519-524

[7]

Boggess A., 2000, 1 COURSE WAVELET FOU

[8] AN EVALUATION OF A MODEL EQUATION FOR WATER-WAVES [J].

BONA, JL ;

PRITCHARD, WG ;

SCOTT, LR .

PHILOSOPHICAL TRANSACTIONS OF THE ROYAL SOCIETY A-MATHEMATICAL PHYSICAL AND ENGINEERING SCIENCES, 1981, 302 (1471) :457-510

[9] A non-homogeneous boundary-value problem for the Korteweg-de Vries equation in a quarter plane [J].

Bona, JL ;

Sun, SM ;

Zhang, BY .

TRANSACTIONS OF THE AMERICAN MATHEMATICAL SOCIETY, 2002, 354 (02) :427-490

[10]

Bracewell RN, 2000, FOURIER TRANSFORM IT

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