Strong convergence of a new general iterative method for variational inequality problems in Hilbert spaces

被引:0
|
作者
Yan-Lai Song
Hui-Ying Hu
Ya-Qin Wang
Lu-Chuan Zeng
Chang-Song Hu
机构
[1] Shanghai Normal University,Department of Mathematics
[2] Hubei Normal University,Department of Mathematics
[3] Shaoxing University,Department of Mathematics
[4] Scientific Computing Key Laboratory of Shanghai University,undefined
来源
Fixed Point Theory and Applications | / 2012卷
关键词
Hilbert space; -strict pseudo-contractions; fixed point; Meir-Keeler contractions;
D O I
暂无
中图分类号
学科分类号
摘要
In this article, we introduce a new iterative scheme with Meir-Keeler contractions for strict pseudo-contractions in Hilbert spaces. We also discuss the strong convergence theorems of the new iterative scheme for variational inequality problems in Hilbert spaces. The methods in this article are interesting and are different from those given in many other articles. Our results improve and extend the corresponding results announced by many others.
引用
收藏
相关论文
共 50 条
  • [1] Strong convergence of a new general iterative method for variational inequality problems in Hilbert spaces
    Song, Yan-Lai
    Hu, Hui-Ying
    Wang, Ya-Qin
    Zeng, Lu-Chuan
    Hu, Chang-Song
    FIXED POINT THEORY AND APPLICATIONS, 2012,
  • [2] Strong convergence of a general iterative method for variational inequality problems and fixed point problems in Hilbert spaces
    Qin, Xiaolong
    Shang, Meijuan
    Zhou, Haiyun
    APPLIED MATHEMATICS AND COMPUTATION, 2008, 200 (01) : 242 - 253
  • [3] A general iterative method for hierarchical variational inequality problems in Hilbert spaces and applications
    Lai-Jiu Lin
    Wataru Takahashi
    Positivity, 2012, 16 : 429 - 453
  • [4] A general iterative method for hierarchical variational inequality problems in Hilbert spaces and applications
    Lin, Lai-Jiu
    Takahashi, Wataru
    POSITIVITY, 2012, 16 (03) : 429 - 453
  • [5] Strong convergence theorems for split variational inequality problems in Hilbert spaces
    Sun, Wenlong
    Lu, Gang
    Jin, Yuanfeng
    Peng, Zufeng
    AIMS MATHEMATICS, 2023, 8 (11): : 27291 - 27308
  • [6] Strong Convergence of an Iterative Method for Equilibrium Problems and Variational Inequality Problems
    Li, HongYu
    Li, HongZhi
    FIXED POINT THEORY AND APPLICATIONS, 2009,
  • [7] Strong Convergence of an Iterative Method for Equilibrium Problems and Variational Inequality Problems
    Hong Yu Li
    Hong Zhi Li
    Fixed Point Theory and Applications, 2009
  • [8] Strong convergence theorem of an iterative method for variational inequalities and fixed point problems in Hilbert spaces
    Nguyen Buong
    APPLIED MATHEMATICS AND COMPUTATION, 2010, 217 (01) : 322 - 329
  • [9] Strong convergence of a general iterative algorithm for equilibrium problems and variational inequality problems
    Qin, Xiaolong
    Shang, Meijuan
    Su, Yongfu
    MATHEMATICAL AND COMPUTER MODELLING, 2008, 48 (7-8) : 1033 - 1046
  • [10] Regularization and iterative method for general variational inequality problem in hilbert spaces
    Cho, Yeol J. E.
    Petrot, Narin
    JOURNAL OF INEQUALITIES AND APPLICATIONS, 2011,
12345