\ TWO-STEP METHOD FOR SOLVING NONLINEAR EQUATIONS WITH NONDIFFERENTIABLE OPERATOR

被引:0
|
作者
Shakhno, Stepan [1 ]
Yarmola, Halina [1 ]
机构
[1] Ivan Franko Natl Univ Lviv, 1 Univ Str, UA-79000 Lvov, Ukraine
来源
JOURNAL OF NUMERICAL AND APPLIED MATHEMATICS | 2012年 / 3卷 / 109期
关键词
Nondifferentiable operator; convergence order; local and semilocal convergence;
D O I
暂无
中图分类号
O29 [应用数学];
学科分类号
070104 ;
摘要
In this paper we propose a two-step method for solving nonlinear equations with a nondifferentiable operator. Its method is based on two methods of order of convergence 1 + root 2. We study a local and a semilocal convergence of the proposed method and set an order of convergence. We apply our results to the numerical solution of a nonlinear equation and systems of nonlinear equations.
引用
收藏
页码:105 / 115
页数:11
相关论文
共 50 条
  • [41] A modified two-step optimal iterative method for solving nonlinear models in one and higher dimensions
    Chang, Chih-Wen
    Qureshi, Sania
    Argyros, Ioannis K.
    Chicharro, Francisco I.
    Soomro, Amanullah
    MATHEMATICS AND COMPUTERS IN SIMULATION, 2025, 229 : 448 - 467
  • [42] Two-step secant type method with approximation of the inverse operator
    Shakhno, S. M.
    Yarmola, H. P.
    CARPATHIAN MATHEMATICAL PUBLICATIONS, 2013, 5 (01) : 150 - 155
  • [43] A Two-Step Iterative Method for Absolute Value Equations
    Khan, Alamgir
    Iqbal, Javed
    INTERNATIONAL JOURNAL OF COMPUTATIONAL METHODS, 2024, 21 (07)
  • [44] The variable two-step BDF method for parabolic equations
    Georgios Akrivis
    Minghua Chen
    Jianxing Han
    Fan Yu
    Zhimin Zhang
    BIT Numerical Mathematics, 2024, 64
  • [45] The variable two-step BDF method for parabolic equations
    Akrivis, Georgios
    Chen, Minghua
    Han, Jianxing
    Yu, Fan
    Zhang, Zhimin
    BIT NUMERICAL MATHEMATICS, 2024, 64 (01)
  • [46] A two-step regularized method of linearization for solving minimization problems
    Vasilyev, FP
    Nedic, A
    Yachimovich, M
    COMPUTATIONAL MATHEMATICS AND MATHEMATICAL PHYSICS, 1996, 36 (05) : 559 - 567
  • [47] A two-step preconditioning method for solving dense linear systems
    Kotakemori, H
    Niki, H
    Okamoto, N
    INTERNATIONAL JOURNAL OF COMPUTATIONAL FLUID DYNAMICS, 2004, 18 (01) : 93 - 99
  • [48] On the Convergence of Two-Step Kurchatov-Type Methods under Generalized Continuity Conditions for Solving Nonlinear Equations
    Argyros, Ioannis K.
    Shakhno, Stepan
    Regmi, Samundra
    Yarmola, Halyna
    SYMMETRY-BASEL, 2022, 14 (12):
  • [49] Multi-step method for solving nonlinear systems of equations
    Univ of New Brunswick, Fredericton, Canada
    Comput Appl Eng Educ, 2 (121-126):
  • [50] Multiple-step method for solving nonlinear systems of equations
    Wong, JY
    COMPUTER APPLICATIONS IN ENGINEERING EDUCATION, 1997, 5 (02) : 121 - 126
12345