An inertial projection neural network for solving inverse variational inequalities

被引：10

作者：

Ju, Xingxing ^{[1
]}

Li, Chuandong ^{[1
]}

He, Xing ^{[1
]}

Feng, Gang ^{[2
]}

机构：

[1] Southwest Univ, Sch Elect & Informat Engn, Natl & Local Joint Engn Lab Intelligent Transmiss, Chongqing 400715, Peoples R China

[2] City Univ Hong Kong, Dept Biomed Engn, Hong Kong, Peoples R China

来源：

NEUROCOMPUTING | 2020年 / 406卷

基金：

中国国家自然科学基金;

关键词：

GLOBAL EXPONENTIAL STABILITY; OPTIMIZATION PROBLEMS; DESIGN;

D O I：

10.1016/j.neucom.2020.04.023

中图分类号：

TP18 [人工智能理论];

学科分类号：

081104 ; 0812 ; 0835 ; 1405 ;

摘要：

A novel inertial projection neural network (IPNN) is proposed for solving inverse variational inequalities (IVIs) in this paper. It is shown that the IPNN has a unique solution under the condition of Lipschitz continuity and that the solution trajectories of the IPNN converge to the equilibrium solution asymptotically if the corresponding operator is co-coercive. Finally, several examples are presented to illustrtae the effectiveness of the proposed IPNN. © 2020 Elsevier B.V.

引用

页码：99 / 105

页数：7

共 41 条

[11] A Novel Neural Network for Generally Constrained Variational Inequalities [J].

Gao, Xingbao ;

Liao, Li-Zhi .

IEEE TRANSACTIONS ON NEURAL NETWORKS AND LEARNING SYSTEMS, 2017, 28 (09) :2062-2075

[12]

Hale J.K., 2013, Introduction to Functional Differential Equations, V99, DOI DOI 10.1007/978-1-4612-4342-7

[13] Solving a class of constrained 'black-box' inverse variational inequalities [J].

He, Bingsheng ;

He, Xiao-Zheng ;

Liu, Henry X. .

EUROPEAN JOURNAL OF OPERATIONAL RESEARCH, 2010, 204 (03) :391-401

[14] Inverse variational inequalities with projection-based solution methods [J].

He, Xiaozheng ;

Liu, Henry X. .

EUROPEAN JOURNAL OF OPERATIONAL RESEARCH, 2011, 208 (01) :12-18

[15] An Inertial Projection Neural Network for Solving Variational Inequalities [J].

He, Xing ;

Huang, Tingwen ;

Yu, Junzhi ;

Li, Chuandong ;

Li, Chaojie .

IEEE TRANSACTIONS ON CYBERNETICS, 2017, 47 (03) :809-814

[16] Solving pseudomonotone variational inequalities and pseudoconvex optimization problems using the projection neural network [J].

Hu, Xiaolin ;

Wang, Jun .

IEEE TRANSACTIONS ON NEURAL NETWORKS, 2006, 17 (06) :1487-1499

[17] A new result for projection neural networks to solve linear variational inequalities and related optimization problems [J].

Huang, Bonan ;

Zhang, Huaguang ;

Gong, Dawei ;

Wang, Zhanshan .

NEURAL COMPUTING & APPLICATIONS, 2013, 23 (02) :357-362

[18] Solving policy design problems: Alternating direction method of multipliers-based methods for structured inverse variational inequalities [J].

Jiang, Yaning ;

Cai, Xingju ;

Han, Deren .

EUROPEAN JOURNAL OF OPERATIONAL RESEARCH, 2020, 280 (02) :417-427

[19] Global exponential stability of neural networks with globally Lipschitz continuous activations and its application to linear variational inequality problem [J].

Liang, XB ;

Si, J .

IEEE TRANSACTIONS ON NEURAL NETWORKS, 2001, 12 (02) :349-359

[20] L1-Minimization Algorithms for Sparse Signal Reconstruction Based on a Projection Neural Network [J].

Liu, Qingshan ;

Wang, Jun .

IEEE TRANSACTIONS ON NEURAL NETWORKS AND LEARNING SYSTEMS, 2016, 27 (03) :698-707

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