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Banach空间中的Mann迭代和Ishikawa迭代

Mann Iterates and Ishikawa Iterates in Banach Space

【作者】 张剑宇

【导师】 崔云安;

【作者基本信息】 哈尔滨理工大学 , 基础数学, 2009, 硕士

【摘要】 本文主要研究了定义在Banach空间上的Mann迭代与Ishikawa迭代,以及在这些迭代下的几类映射的收敛性问题。文章首先介绍了在紧空间下的上述映射的收敛性问题,由于紧空间具有任何无穷序列都有收敛子列的性质,从而使问题容易得到证明,接着本文又继续讨论了在非紧空间中上述映射的收敛性问题,由于去掉了紧性条件,因此我们引入了条件I,从而使结论得以证明。首先,我们讲述了不动点理论的发展概况。通过引用大量前人的定义和定理,使我们对不动点的发展史有了一定程度的认识。其次,我们主要研究在紧空间下的非扩张映射的Mann迭代和Ishikawa迭代的收敛性问题。首先给出与定理相关的定义,如非扩张映射,点到集合的距离,Mann和Ishikawa的具体迭代方式,Hausdoff距离和本文中用到的一些引理。接着给出了紧空间下的非扩张映射的Mann迭代和Ishikawa迭代的收敛性。最后,研究了在非紧空间下的映射的迭代收敛性问题。由于紧性条件的减弱,我们加入了条件I,也使收敛性结论成立。本章首先给出了具体的Mann迭代方式,继而分别给出非扩张映射,亚非扩张映射和广义非扩张映射在该种迭代下收敛到相应映射不动点的结论。

【Abstract】 It is primarily studied in Banach space that some kinds of mappings converge to these mappings’fixed point in sense of Mann iterations and Ishikawa iterations. First, the mappings’convergence problems in compac-tive space is extended in this paper In this paper. Because there is at least one subsequence in any numerous sequences in compactive space, the question mentioned above can be proved easily. In addition, it continues to discuss the mappings’convergence problems in non-compactive space. Since the condition of compact is not available, condition I is introduced. The result of the above is still correct.First, the history of fixed points is represented. Lots of theories and defi-nitions are quoted. We can know something about the fixed point development.Second, it is primarily studied nonexpansive mappings’convergence pro-blems in sense of Mann iteration or Ishikawa iteration. At first, it can be known some definitions related with this paper. Such as nonexpansive mapping, Mann iteration and Ishikawa iteration, Hausdoff metric and some related theorems. In addition, it is proved that in compactive space, the mapping in sense of Mann iteration or Ishikawa iteration converges to the fixed point of the mapping.Finally, it is proved that these mappings converge in non-compactive space. Since the compactive space is not available, the result is still true by assumption of condition I. A new Mann iteraton is introduced. Then this paper gives us the results that the mapping converges to its fixed point which can be nonexpansive mapping, quasi-nonexpansive mapping or generalized nonexpansive mapping.

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