An Over-Relaxed (A, η, m)-Proximal Point Algorithm for System of Nonlinear Fuzzy-Set Valued Operator Equation Frameworks and Fixed Point Problems

机译：非线性模糊集值算子方程框架和不动点问题的系统的过度松弛（A，η，m）-近点算法

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摘要

In order to find the common solutions for nonlinear fuzzy-set valued operator equations and fixed point problems of Lipschitz continuous operators in Hilbert spaces, the purpose of this paper is to construct a new class of over-relaxed (A, η, m)-proximal point algorithm framework with errors by using some results on the resolvent operator corresponding to (A, η, m)-maximal monotonicity. Further, the variational graph convergence analysis for this algorithm framework is investigated. Finally, some examples of applying the main result is also given. The results presented in this paper improve and generalize some well known results in recent literatures.

机译：为了找到希尔伯特空间中非线性模糊集值算子方程和Lipschitz连续算子的不动点问题的通用解，本文的目的是构造一类新的过松弛（A，η，m）-通过在与（A，η，m）-最大单调性相对应的可分解算子上使用一些结果来确定带有错误的近点算法框架。此外，研究了该算法框架的变异图收敛性分析。最后，给出了应用主要结果的一些例子。本文提出的结果改进并归纳了最近文献中的一些众所周知的结果。

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来源
《Integrated uncertainty in knowledge modelling and decision making》|2011年|p.133-142|共10页
会议地点 Hangzhou(CN);Hangzhou(CN)
作者
Heng-you Lan; Xiao Wang; Tingjian Xiong; Yumin Xiang;
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作者单位

School of Science, Sichuan University of Science Engineering, Zigong, Sichuan 643000, P.R. China;

School of Computer and Science, Sichuan University of Science Engineering, Zigong, Sichuan 643000, P.R. China;

School of Science, Sichuan University of Science Engineering, Zigong, Sichuan 643000, P.R. China;

School of Science, Sichuan University of Science Engineering, Zigong, Sichuan 643000, P.R. China;

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会议组织
原文格式 PDF
正文语种 eng
中图分类人工智能理论;
关键词
(A; η; m)-maximal monotonicity; nonlinear fuzzy-set valued operator equation and fixed point problem; over-relaxed (A; η; m)-proximal point algorithm with errors; variational graphical convergence;

机译：（A；η； m）-最大单调性；非线性模糊集值算子方程和不动点问题；具有误差的过松弛（A;η; m）-近点算法;变分图形收敛;

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专利

1. On Over-Relaxed Proximal Point Algorithms for Generalized Nonlinear Operator Equation with (A,η,m)-Monotonicity Framework [J] . Fang Li International Journal of Modern Nonlinear Theory and Application . 2012,第3期

机译：具有（A，η，m）-单调性框架的广义非线性算子方程的过度松弛近点算法
2. Convergence analysis of the over-relaxed proximal point algorithms with errors for generalized nonlinear random operator equations [J] . Cai L., Lan H.-Y. Journal of computational analysis and applications . 2013,第7期

机译：广义非线性随机算子方程带误差的过度松弛近点算法的收敛性分析
3. General hybrid (A, η, m)-proximal point algorithm frameworks for finding common solutions of nonlinear operator equations and fixed point problems [J] . Heng-You Lan, Lecai Cai, Shulin Wu Communications in Nonlinear Science and Numerical Simulation . 2013,第4期

机译：通用混合（A，η，m）-近点算法框架，用于查找非线性算子方程和不动点问题的通用解
4. An Over-Relaxed (A, η, m)-Proximal Point Algorithm for System of Nonlinear Fuzzy-Set Valued Operator Equation Frameworks and Fixed Point Problems [C] . Heng-you Lan, Xiao Wang, Tingjian Xiong, International Symposium on Integrated Uncertainty in Knowledge Modelling and Decision Making . 2011

机译：用于非线性模糊设定值算子方程框架和定点问题的非线性模糊集价值系统的过度放松（A，η，M）普遍点算法
5. Parallel algorithms and software for time-dependent systems of nonlinear partial differential equations with an application in computational biology. [D] . Murillo, Maria Silva. 2002

机译：非线性偏微分方程时间相关系统的并行算法和软件及其在计算生物学中的应用。
6. Multivariate systems of nonexpansive operator equations and iterative algorithms for solving them in uniformly convex and uniformly smooth Banach spaces with applications [O] . Yongchun Xu, Jinyu Guan, Yanxia Tang, -1

机译：非膨胀算子方程的多元系统及其在一致凸和一致光滑Banach空间中求解它们的迭代算法及其应用
7. The Over-Relaxed A-Proximal Point Algorithm for General Nonlinear Mixed Set-Valued Inclusion Framework [O] . Xian Bing Pan, Hong Gang Li, An Jian Xu 2011

机译：通用非线性混合集值包含框架的过松弛A近点算法

An Over-Relaxed (A, η, m)-Proximal Point Algorithm for System of Nonlinear Fuzzy-Set Valued Operator Equation Frameworks and Fixed Point Problems

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