| 不具Lipschiz条件的一般变分不等式解的带误差Ishikawa迭代逼近 |
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| 引用本文: | 罗春林.不具Lipschiz条件的一般变分不等式解的带误差Ishikawa迭代逼近[J].四川师范大学学报(自然科学版),2010,33(2). |
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| 作者姓名: | 罗春林 |
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| 作者单位: | 四川民族学院,数学系,四川,康定,626001 |
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| 基金项目: | 四川省教育厅自然科学重点基金 |
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| 摘 要: | 通过引入辅助次微分原理,在Banach空间中证明了一类一般变分不等式解的存在性定理,在非线性算子不具Lipschitz条件下,建立和分析了这类一般变分不等式解的带误差Ishikawa迭代逼近.这些算法和结果改进和推广了许多已知的结果.
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| 关 键 词: | Lipschitz条件 一般变分不等式 强单调 反单调 辅助次微分原理 |
Ishikawa Iterative Approximation with Error of Solutions for General Variational Inequalities without Lipschitz Condition |
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| LUO Chun-lin.Ishikawa Iterative Approximation with Error of Solutions for General Variational Inequalities without Lipschitz Condition[J].Journal of Sichuan Normal University(Natural Science),2010,33(2). |
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| Authors: | LUO Chun-lin |
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| Institution: | LUO Chun-lin(Department of Mathematics,Sichuan College for Nationalities,Kangding 626001,Sichuan) |
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| Abstract: | In this paper,by introducing auxiliary subdifferential principle,an existence theorem of solutions for a class of general variational inequalities is proved in Banach space,and an Ishikawa iterative approximation with error of solutions for the general variational inequalities without Lipschitz condition is suggested and analyzed.These algorithms and results improve and generalize many known results in literature. |
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| Keywords: | Lipschitz condition general variational inequalities strongly monotone antimonotone auxiliary subdifferential principle |
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