Stability of Fixed Points of Partial Contractivities and Fractal Surfaces

Axioms Pub Date : 2024-07-13 DOI:10.3390/axioms13070474
M.A. Navascués
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Abstract

In this paper, a large class of contractions is studied that contains Banach and Matkowski maps as particular cases. Sufficient conditions for the existence of fixed points are proposed in the framework of b-metric spaces. The convergence and stability of the Picard iterations are analyzed, giving error estimates for the fixed-point approximation. Afterwards, the iteration proposed by Kirk in 1971 is considered, studying its convergence, stability, and error estimates in the context of a quasi-normed space. The properties proved can be applied to other types of contractions, since the self-maps defined contain many others as particular cases. For instance, if the underlying set is a metric space, the contractions of type Kannan, Chatterjea, Zamfirescu, Ćirić, and Reich are included in the class of contractivities studied in this paper. These findings are applied to the construction of fractal surfaces on Banach algebras, and the definition of two-variable frames composed of fractal mappings with values in abstract Hilbert spaces.
部分收缩率和分形曲面定点的稳定性
本文研究了一大类包含巴拿赫映射和马特科夫斯基映射的收缩。在 b-度量空间框架内提出了定点存在的充分条件。分析了 Picard 迭代的收敛性和稳定性,给出了定点逼近的误差估计。随后,考虑了柯克在 1971 年提出的迭代,研究了其在准规范空间中的收敛性、稳定性和误差估计。所证明的性质可应用于其他类型的收缩,因为所定义的自映射包含许多其他特殊情况。例如,如果底层集合是一个度量空间,那么 Kannan、Chatterjea、Zamfirescu、Ćirić 和 Reich 类型的收缩就包含在本文研究的收缩类型中。这些发现被应用于巴纳赫代数上分形曲面的构建,以及由在抽象希尔伯特空间中具有值的分形映射组成的双变量框架的定义。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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