| 自反Banach空间中非扩张非自映射的粘滞迭代逼近方法 |
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| 引用本文: | 宋义生,李庆春. 自反Banach空间中非扩张非自映射的粘滞迭代逼近方法[J]. 系统科学与数学, 2007, 27(4): 481-487 |
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| 作者姓名: | 宋义生 李庆春 |
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| 作者单位: | 河南师范大学数学与信息科学学院,新乡,453007 |
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| 摘 要: | 主要在自反和严格凸的且具有一致G(a)teaux可微范数的Banach空间中研究了非扩张非自映射的粘滞迭代逼近过程,证明了此映射的隐格式与显格式粘滞迭代序列均强收敛到它的某个不动点.
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| 关 键 词: | 非扩张非自映射 粘滞迭代方法 严格凸的Banach空间 |
| 收稿时间: | 2006-09-08 |
| 修稿时间: | 2006-09-08 |
Viscosity Approximation for Nonexpansive Nonself-Mappings InReflexive Banach Spaces |
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| Song Yisheng,Li Qingchun. Viscosity Approximation for Nonexpansive Nonself-Mappings InReflexive Banach Spaces[J]. Journal of Systems Science and Mathematical Sciences, 2007, 27(4): 481-487 |
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| Authors: | Song Yisheng Li Qingchun |
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| Affiliation: | College of Mathematics and Information Science, Henan Normal University, Xinxiang 453007 |
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| Abstract: | Let $E$ be a reflexive and strictly convex Banach space with a uniformly G^ateaux differentiable norm, and $K$ be a nonempty closed convex subset of $E$ which is also a sunny nonexpansive retract of $E$. Assume that $T:Kto E$ is a nonexpansive mapping with $F(T)neqemptyset$, and $f:Kto K$ is a fixed contractive mapping. The implicit iterative sequence ${x_t}$ is defined by $x_t=P(tf(x_t)+(1-t)Tx_t)$ for $tin (0,1).$ The explicit iterative sequence${x_n}$ is given by $x_{n+1}=P(alpha_nf(x_n)+(1-alpha_n)Tx_n)$, where $alpha_nin(0,1)$ satisfies appropriate conditions and $P$ is nonexpansive retraction of $E$ onto $K$. It is shown that ${x_t}$ and ${x_n}$ strongly converges to a fixed point of $T$. |
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| Keywords: | Nonexpansive nonself-mappings viscosity approximation strictly convex Banach space |
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