Related references
Note: Only part of the references are listed.Gradient methods with selection technique for the multiple-sets split feasibility problem
Yonghong Yao et al.
OPTIMIZATION (2020)
Proximal type algorithms involving linesearch and inertial technique for split variational inclusion problem in hilbert spaces with applications
Suparat Kesornprom et al.
OPTIMIZATION (2019)
Nonlinear iteration method for proximal split feasibility problems
Yekini Shehu et al.
MATHEMATICAL METHODS IN THE APPLIED SCIENCES (2018)
Accelerated hybrid viscosity and steepest-descent method for proximal split feasibility problems
Yekini Shehu et al.
OPTIMIZATION (2018)
On split inclusion problem and fixed point problem for multi-valued mappings
Yekini Shehu et al.
COMPUTATIONAL & APPLIED MATHEMATICS (2018)
Convergence analysis for the proximal split feasibility problem using an inertial extrapolation term method
Yekini Shehu et al.
JOURNAL OF FIXED POINT THEORY AND APPLICATIONS (2017)
Simultaneous Subgradient Algorithms for the Generalized Split Variational Inclusion Problem in Hilbert Spaces
Chih-Sheng Chuang
NUMERICAL FUNCTIONAL ANALYSIS AND OPTIMIZATION (2017)
Hybrid inertial proximal algorithm for the split variational inclusion problem in Hilbert spaces with applications
Chih-Sheng Chuang
OPTIMIZATION (2017)
Convergence analysis of an iterative algorithm for fixed point problems and split feasibility problems in certain Banach spaces
Y. Shehu et al.
OPTIMIZATION (2016)
An algorithm for a class of split feasibility problems: application to a model in electricity production
Le Hai Yen et al.
MATHEMATICAL METHODS OF OPERATIONS RESEARCH (2016)
Self-adaptive algorithms for proximal split feasibility problems and strong convergence analysis
Yonghong Yao et al.
FIXED POINT THEORY AND APPLICATIONS (2015)
General Split Variational Inclusion Problem in Hilbert Spaces
Li Yang et al.
Abstract and Applied Analysis (2014)
Solving proximal split feasibility problems without prior knowledge of operator norms
A. Moudafi et al.
OPTIMIZATION LETTERS (2014)
Strong convergence theorems for the split variational inclusion problem in Hilbert spaces
Chih-Sheng Chuang
FIXED POINT THEORY AND APPLICATIONS (2013)
The strong convergence of a KM-CQ-like algorithm for a split feasibility problem
Yazheng Dang et al.
INVERSE PROBLEMS (2011)
Self-adaptive projection methods for the multiple-sets split feasibility problem
Jinling Zhao et al.
INVERSE PROBLEMS (2011)
Split Monotone Variational Inclusions
A. Moudafi
JOURNAL OF OPTIMIZATION THEORY AND APPLICATIONS (2011)
Iterative methods for the split feasibility problem in infinite-dimensional Hilbert spaces
Hong-Kun Xu
INVERSE PROBLEMS (2010)
Approximating Curve and Strong Convergence of the CQ Algorithm for the Split Feasibility Problem
Fenghui Wang et al.
JOURNAL OF INEQUALITIES AND APPLICATIONS (2010)
MATRIX p-NORMS ARE NP-HARD TO APPROXIMATE IF p not equal 1, 2, infinity
Julien M. Hendrickx et al.
SIAM JOURNAL ON MATRIX ANALYSIS AND APPLICATIONS (2010)
Convergence theorems for inertial KM-type algorithms
Paul-Emile Mainge
JOURNAL OF COMPUTATIONAL AND APPLIED MATHEMATICS (2008)
A variable Krasnosel'skii-Mann algorithm and the multiple-set split feasibility problem
Hong-Kun Xu
INVERSE PROBLEMS (2006)
A unified approach for inversion problems in intensity-modulated radiation therapy
Yair Censor et al.
PHYSICS IN MEDICINE AND BIOLOGY (2006)
A note on the CQ algorithm for the split feasibility problem
B Qu et al.
INVERSE PROBLEMS (2005)
A unified treatment of some iterative algorithms in signal processing and image reconstruction
C Byrne
INVERSE PROBLEMS (2004)
Numerical solutions to Nash-Cournot equilibria in coupled constraint electricity markets
J Contreras et al.
IEEE TRANSACTIONS ON POWER SYSTEMS (2004)
The relaxed CQ algorithm solving the split feasibility problem
QZ Yang
INVERSE PROBLEMS (2004)
Iterative oblique projection onto convex sets and the split feasibility problem
C Byrne
INVERSE PROBLEMS (2002)
A weak-to-strong convergence principle for Fejer-monotone methods in Hilbert spaces
HH Bauschke et al.
MATHEMATICS OF OPERATIONS RESEARCH (2001)
An inertial proximal method for maximal monotone operators via discretization of a nonlinear oscillator with damping
F Alvarez et al.
SET-VALUED ANALYSIS (2001)
Approximating solutions of maximal monotone operators in Hilbert spaces
S Kamimura et al.
JOURNAL OF APPROXIMATION THEORY (2000)
Forcing strong convergence of proximal point iterations in a Hilbert space
MV Solodov et al.
MATHEMATICAL PROGRAMMING (2000)
Share Paper
