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拟变分不等式研究及其在交通问题中的应用 被引量:4

Some Research on the Quasi-variational Inequality and its Application in Traffic
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摘要 本文研究一类拟变分不等式问题解的存在性与唯一性,构造解的两种算法,即投影算法与超平面投影算法,给出相应的收敛性分析.作为本文结果的应用,我们研究了交通流量和环境影响的问题,并通过数值实验模拟相关结果. In this paper, we work on the existence and the uniqueness of solution for a class of quasivariational inequality problems. We construct two algorithms for this quasi-variational inequality problem: projection algorithm and hyperplane projection algorithm,and give convergence analysis respectively. As the application of results obtained in this paper, we consider the problem of traffic flow and environmental influence, and.give the simulation by numerical experiment.
作者 郭小亚 张从军
机构地区 东南大学数学系 南京财经大学应用数学学院
出处 《应用数学》 CSCD 北大核心 2015年第4期743-752,共10页 Mathematica Applicata
基金 国家自然科学基金(11071109)
关键词 拟变分不等式 存在唯一性 投影算法 超平面投影算法 Quasi-variational inequality Existence and uniqueness Projection algorithm Hyperplane projection algorithm
分类号 O177.9 [理学—基础数学]
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参考文献16

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  • 9Noor M A. On general quasi-variational inequalities[J].Journal of King Saud University-Science, 2012, 24(1): 81-88.
  • 10Outrata J V, Zowe J.A Newton method for a class of quasi-variational inequalities[J]. Computational Optimization and Applications, 1995, 4(1):5-21.

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引证文献4

应用数学
2015年 第4期

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