一种新迭代方法的收敛速度和数据相关性比较

IF 0.7 Q2 MATHEMATICS

Tbilisi Mathematical Journal Pub Date : 2020-12-01 DOI:10.32513/tbilisi/1608606050

Samet Maldar, Yunus Atalan, Kadri Doğan

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引用次数: 1

摘要

本文定义了一些迭代方法的双曲型。研究了双曲空间中满足一定条件的映射的新迭代收敛性。已经证明了这种迭代在收敛性方面与同一空间中的另一种迭代方法是等价的。比较了这两种迭代方法的收敛速度。我们使用双曲型迭代研究了数据相关性结果。最后，我们给出了收敛速度和数据相关性的数值例子。

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Comparison rate of convergence and data dependence for a new iteration method

In this paper, we have defined hyperbolic type of some iteration methods. The new iteration has been investigated convergence for mappings satisfying certain condition in hyperbolic spaces. It has been proved that this iteration is equivalent in terms of convergence with another iteration method in the same spaces. The rate of convergence of these two iteration methods have been compared. We have investigated data dependence result using hyperbolic type iteration. Finally, we have given numerical examples about rate of convergence and data dependence.

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Tbilisi Mathematical Journal MATHEMATICS-

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