A Modified Tseng Splitting Method with Double Inertial Steps for Solving Monotone Inclusion Problems
出版年份 2023 全文链接
标题
A Modified Tseng Splitting Method with Double Inertial Steps for Solving Monotone Inclusion Problems
作者
关键词
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出版物
JOURNAL OF SCIENTIFIC COMPUTING
Volume 96, Issue 3, Pages -
出版商
Springer Science and Business Media LLC
发表日期
2023-08-11
DOI
10.1007/s10915-023-02311-5
参考文献
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注意:仅列出部分参考文献,下载原文获取全部文献信息。- Inertial Splitting Methods Without Prior Constants for Solving Variational Inclusions of Two Operators
- (2022) Prasit Cholamjiak et al. Bulletin of the Iranian Mathematical Society
- Subgradient Extragradient Method with Double Inertial Steps for Variational Inequalities
- (2022) Yonghong Yao et al. JOURNAL OF SCIENTIFIC COMPUTING
- Second Order Splitting Dynamics with Vanishing Damping for Additively Structured Monotone Inclusions
- (2022) Radu Ioan Boţ et al. Journal of Dynamics and Differential Equations
- A modified inertial subgradient extragradient method for solving variational inequalities
- (2021) Yekini Shehu et al. OPTIMIZATION AND ENGINEERING
- Explicit extragradient-like method with adaptive stepsizes for pseudomonotone variational inequalities
- (2021) Duong Viet Thong et al. Optimization Letters
- Strong convergence of inertial forward–backward methods for solving monotone inclusions
- (2021) Tan Bing et al. APPLICABLE ANALYSIS
- Inertial projection and contraction algorithms with larger step sizes for solving quasimonotone variational inequalities
- (2021) Zhong-bao Wang et al. JOURNAL OF GLOBAL OPTIMIZATION
- Relaxed Forward–Backward Splitting Methods for Solving Variational Inclusions and Applications
- (2021) Prasit Cholamjiak et al. JOURNAL OF SCIENTIFIC COMPUTING
- An Efficient Inertial Type Iterative Algorithm to Approximate the Solutions of Quasi Variational Inequalities in Real Hilbert Spaces
- (2021) Ayşegül Keten Çopur et al. JOURNAL OF SCIENTIFIC COMPUTING
- Modified forward–backward splitting method for variational inclusions
- (2020) Dang Van Hieu et al. 4OR-A Quarterly Journal of Operations Research
- Relaxed Inertial Tseng’s Type Method for Solving the Inclusion Problem with Application to Image Restoration
- (2020) Jamilu Abubakar et al. Mathematics
- Strong convergence theorems for inertial Tseng’s extragradient method for solving variational inequality problems and fixed point problems
- (2020) Gang Cai et al. Optimization Letters
- First-order optimization algorithms via inertial systems with Hessian driven damping
- (2020) Hedy Attouch et al. MATHEMATICAL PROGRAMMING
- A strong convergence theorem for Tseng’s extragradient method for solving variational inequality problems
- (2019) Duong Viet Thong et al. Optimization Letters
- Convergence of a Relaxed Inertial Forward–Backward Algorithm for Structured Monotone Inclusions
- (2019) Hedy Attouch et al. APPLIED MATHEMATICS AND OPTIMIZATION
- Convergence analysis of projection method for variational inequalities
- (2019) Yekini Shehu et al. computational and applied mathematics
- Tseng type methods for solving inclusion problems and its applications
- (2018) Aviv Gibali et al. CALCOLO
- A strong convergence result involving an inertial forward–backward algorithm for monotone inclusions
- (2017) Qiaoli Dong et al. Journal of Fixed Point Theory and Applications
- A Generalized Forward-Backward Splitting
- (2013) Hugo Raguet et al. SIAM Journal on Imaging Sciences
- Convergence theorems for inertial KM-type algorithms
- (2007) Paul-Emile Maingé JOURNAL OF COMPUTATIONAL AND APPLIED MATHEMATICS
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