Algorithms for split equality variational inequality and fixed point problems

被引：2

作者：

Mekuriaw, Gedefaw ^{[1
,2
]}

Zegeye, Habtu ^{[3
]}

Takele, Mollalgn Haile ^{[1
]}

Tufa, Abebe Regassa ^{[4
]}

机构：

[1] Bahir Dar Univ, Dept Math, Bahir Dar, Ethiopia

[2] Debre Markos Univ, Dept Math, Debre Markos, Ethiopia

[3] Botswana Int Univ Sci & Technol, Dept Math, Palapye, Botswana

[4] Univ Botswana, Dept Math, Gaborone, Botswana

来源：

APPLICABLE ANALYSIS | 2024年 / 103卷 / 17期

关键词：

Inertial iterative algorithm; quasi-monotone mappings; weakly sequentially continuous mappings; variational inequality problem split equality problems; SUBGRADIENT EXTRAGRADIENT METHOD; ITERATIVE ALGORITHMS; INCLUSION PROBLEMS; STRONG-CONVERGENCE; FEASIBILITY;

D O I：

10.1080/00036811.2024.2348669

中图分类号：

O29 [应用数学];

学科分类号：

070104 ;

摘要：

This study presents algorithms for addressing split equality variational inequality and fixed point problems in real Hilbert spaces that are inertial-like subgradient extragradient and inertial-like Tseng extragradient, respectively. We prove that the resulting sequences of the proposed algorithms converge strongly to solutions of the problem provided that the underlying mappings are quasi-monotone, uniformly continuous and quasi-nonexpansive mappings under some mild conditions. Furthermore, numerical experiments are shown to demonstrate the effectiveness of our techniques.

引用

页码：3267 / 3294

页数：28

共 53 条

[11] A unified approach for inversion problems in intensity-modulated radiation therapy [J].

Censor, Yair ;

Bortfeld, Thomas ;

Martin, Benjamin ;

Trofimov, Alexei .

PHYSICS IN MEDICINE AND BIOLOGY, 2006, 51 (10) :2353-2365

[12] Common Zero for a Finite Family of Monotone Mappings in Hadamard Spaces with Applications [J].

Chang, Shih-sen ;

Yao, Jen-Chih ;

Wen, Ching-Feng ;

Yang, Li ;

Qin, Li-Jian .

MEDITERRANEAN JOURNAL OF MATHEMATICS, 2018, 15 (04)

[13] STRONGLY CONVERGENT ITERATIVE METHODS FOR SPLIT EQUALITY VARIATIONAL INCLUSION PROBLEMS IN BANACH SPACES [J].

Chang, Shih-sen ;

Wang, Lin ;

Qin, Lijuan ;

Ma, Zhaoli .

ACTA MATHEMATICA SCIENTIA, 2016, 36 (06) :1641-1650

[14]

Combettes P. L., 1996, Advances in Imaging and Electron Physics, V95, P155, DOI DOI 10.1016/S1076-5670(08)70157-5

[15] PSEUDOMONOTONE COMPLEMENTARITY-PROBLEMS IN HILBERT-SPACE [J].

COTTLE, RW ;

YAO, JC .

JOURNAL OF OPTIMIZATION THEORY AND APPLICATIONS, 1992, 75 (02) :281-295

[16] Convergence of the Modified Extragradient Method for Variational Inequalities with Non-Lipschitz Operators [J].

Denisov S.V. ;

Semenov V.V. ;

Chabak L.M. .

Cybernetics and Systems Analysis, 2015, 51 (05) :757-765

[17] Modified Tseng's extragradient methods for solving pseudo-monotone variational inequalities [J].

Duong Viet Thong ;

Phan Tu Vuong .

OPTIMIZATION, 2019, 68 (11) :2203-2222

[18]

Fichera G., 1964, ACCADEMIA NAZIONALE, VVII

[19] An efficient iterative method for finding common fixed point and variational inequalities in Hilbert spaces [J].

Gibali, Aviv ;

Shehu, Yekini .

OPTIMIZATION, 2019, 68 (01) :13-32

[20] Strong convergence theorems for the split equality variational inclusion problem and fixed point problem in Hilbert spaces [J].

Guo, Haili ;

He, Huimin ;

Chen, Rudong .

FIXED POINT THEORY AND APPLICATIONS, 2015, :1-18

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