Iterative process for solving a multiple-set split feasibility problem

被引:0
|
作者
Yazheng Dang
Zhonghui Xue
机构
[1] University of Shanghai for Science and Technology,School of Management
[2] Henan Polytechnic University,College of Computer Science and Technology
[3] Henan Polytechnic University,School of Physics and Chemistry
来源
Journal of Inequalities and Applications | / 2015卷
关键词
multiple-set split feasibility problem; subgradient; accelerated iterative algorithm; convergence; 47H05; 47J05; 47J25;
D O I
暂无
中图分类号
学科分类号
摘要
This paper deals with a variant relaxed CQ algorithm by using a new searching direction, which is not the gradient of a corresponding function. The strategy is to intend to improve the convergence. Its convergence is proved under some suitable conditions. Numerical results illustrate that our variant relaxed CQ algorithm converges more quickly than the existing algorithms.
引用
收藏
相关论文
共 50 条
  • [1] Iterative process for solving a multiple-set split feasibility problem
    Dang, Yazheng
    Xue, Zhonghui
    JOURNAL OF INEQUALITIES AND APPLICATIONS, 2015,
  • [2] An Extrapolated Iterative Algorithm for Multiple-Set Split Feasibility Problem
    Dang, Yazheng
    Gao, Yan
    ABSTRACT AND APPLIED ANALYSIS, 2012,
  • [3] An iterative method for solving multiple-set split feasibility problems in Banach spaces
    Al-Homidan, S.
    Ali, B.
    Suleiman, Y., I
    CARPATHIAN JOURNAL OF MATHEMATICS, 2020, 36 (01) : 1 - 13
  • [4] Solving the multiple-set split feasibility problem and the equilibrium problem by a new relaxed CQ algorithm
    Kunrada Kankam
    Pittaya Srinak
    Prasit Cholamjiak
    Nattawut Pholasa
    Rendiconti del Circolo Matematico di Palermo Series 2, 2020, 69 : 1131 - 1148
  • [5] Solving the multiple-set split feasibility problem and the equilibrium problem by a new relaxed CQ algorithm
    Kankam, Kunrada
    Srinak, Pittaya
    Cholamjiak, Prasit
    Pholasa, Nattawut
    RENDICONTI DEL CIRCOLO MATEMATICO DI PALERMO, 2020, 69 (03) : 1131 - 1148
  • [6] PARALLEL ITERATIVE ALGORITHM FOR SOLVING THE MULTIPLE-SET SPLIT COMMON FIXED-POINT PROBLEM
    Zhao, Jing
    Hou, Dingfang
    Zong, Haili
    JOURNAL OF NONLINEAR AND CONVEX ANALYSIS, 2018, 19 (11) : 2007 - 2019
  • [7] An inertial extrapolation method for multiple-set split feasibility problem
    Guash Haile Taddele
    Poom Kumam
    Anteneh Getachew Gebrie
    Journal of Inequalities and Applications, 2020
  • [8] Strong Convergence for Generalized Multiple-Set Split Feasibility Problem
    Latif, A.
    Vahidi, J.
    Eslamian, M.
    FILOMAT, 2016, 30 (02) : 459 - 467
  • [9] Convergence analysis of an iterative method for solving multiple-set split feasibility problems in certain Banach spaces
    Mewomo, O. T.
    Ogbuisi, F. U.
    QUAESTIONES MATHEMATICAE, 2018, 41 (01) : 129 - 148
  • [10] Half-Space Relaxation Projection Method for Solving Multiple-Set Split Feasibility Problem
    Taddele, Guash Haile
    Kumam, Poom
    Gebrie, Anteneh Getachew
    Sitthithakerngkiet, Kanokwan
    MATHEMATICAL AND COMPUTATIONAL APPLICATIONS, 2020, 25 (03)
12345