ITERATIVE SCHEMES FOR SOLVING NEW SYSTEM OF GENERAL EQUATIONS

被引:0
作者
Noor, Muhammad Aslam [1 ]
Noor, Khalida Inayat [1 ]
机构
[1] Department of Mathematics, COMSATS University Islamabad, Islamabad, Pakistan
来源
UPB Scientific Bulletin, Series A: Applied Mathematics and Physics | 2022年 / 84卷 / 01期
关键词
Iterative methods;
D O I
暂无
中图分类号
O24 [计算数学];
学科分类号
070102 ;
摘要
In this paper, we consider a new system of general equations, which can be used to study the odd-order and nonsymmetric boundary value problems. It is shown that LaxMilgram Lemma and Reisz-Fréchet representation theorem can be obtained as special cases. We use the auxiliary principle technique to prove the existence of a solution to the general equations. This technique is also used to suggest some new iterative methods. The convergence analysis of the proposed methods is analyzed under some mild conditions. Ideas and techniques of this paper may stimulate further research. © 2022, Politechnica University of Bucharest. All rights reserved.
引用
收藏
页码:59 / 70
相关论文
共 50 条
[31]   Newton-like iterative methods for solving system of non-linear equations [J].
Golbabai, A. ;
Javidi, M. .
APPLIED MATHEMATICS AND COMPUTATION, 2007, 192 (02) :546-551
[32]   NEW FAMILY OF ITERATIVE METHODS FOR SOLVING NON-LINEAR EQUATIONS USING NEW ADOMIAN POLYNOMIALS [J].
Rafiq, Arif ;
Pasha, Ayesha Inam ;
Lee, Byung-Soo .
JOURNAL OF THE KOREAN SOCIETY OF MATHEMATICAL EDUCATION SERIES B-PURE AND APPLIED MATHEMATICS, 2015, 22 (03) :231-243
[33]   A class of iterative methods for solving nonlinear protection equations [J].
Sun, D .
JOURNAL OF OPTIMIZATION THEORY AND APPLICATIONS, 1996, 91 (01) :123-140
[34]   Iterative Gradient Descent Methods for Solving Linear Equations [J].
A. B. Samokhin ;
A. S. Samokhina ;
A. Ya. Sklyar ;
Yu. V. Shestopalov .
Computational Mathematics and Mathematical Physics, 2019, 59 :1267-1274
[35]   The Fibonacci family of iterative processes for solving nonlinear equations [J].
Kogan, Tamara ;
Sapir, Luba ;
Sapir, Amir ;
Sapir, Ariel .
APPLIED NUMERICAL MATHEMATICS, 2016, 110 :148-158
[36]   Iterative Gradient Descent Methods for Solving Linear Equations [J].
Samokhin, A. B. ;
Samokhina, A. S. ;
Sklyar, A. Ya ;
Shestopalov, Yu, V .
COMPUTATIONAL MATHEMATICS AND MATHEMATICAL PHYSICS, 2019, 59 (08) :1267-1274
[37]   On Iterative Methods for Solving Nonlinear Equations in Quantum Calculus [J].
Sana, Gul ;
Mohammed, Pshtiwan Othman ;
Shin, Dong Yun ;
Noor, Muhmmad Aslam ;
Oudat, Mohammad Salem .
FRACTAL AND FRACTIONAL, 2021, 5 (03)
[38]   Convergence Criteria of Three Step Schemes for Solving Equations [J].
Regmi, Samundra ;
Argyros, Christopher I. ;
Argyros, Ioannis K. ;
George, Santhosh .
MATHEMATICS, 2021, 9 (23)
[39]   Modified overrelaxed iterative solution schemes for separable generalized equations [J].
Uko, Livinus U. .
NONLINEAR ANALYSIS-THEORY METHODS & APPLICATIONS, 2005, 63 (5-7) :E647-E657
[40]   Iterative schemes for finding all roots simultaneously of nonlinear equations [J].
Cordero, Alicia ;
Garrido, Neus ;
Torregrosa, Juan R. ;
Triguero-Navarro, Paula .
APPLIED MATHEMATICS LETTERS, 2022, 134
12345