C*−代数值偏度量空间中不动点的存在性及其边值问题和矩阵方程的应用

Pub Date : 2022-12-01 DOI:10.2478/ausm-2022-0023

A. Tomar, M. Joshi

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引用次数: 1

摘要

摘要利用C*−代数值偏度量空间中的Hardy-Rogers收缩和CJM -收缩来创建一个不动点的建立环境。接下来，我们将给出示例来详细说明新空间并验证我们的结果。我们通过解决一个边值问题和一个矩阵方程作为我们主要结果的应用来结束本文，这些结果表明了我们的收缩的意义和对此类研究的动机。

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On existence of fixed points and applications to a boundary value problem and a matrix equation in C*−algebra valued partial metric spaces

Abstract We utilize Hardy-Rogers contraction and CJM−contraction in a C*−algebra valued partial metric space to create an environment to establish a fixed point. Next, we present examples to elaborate on the novel space and validate our result. We conclude the paper by solving a boundary value problem and a matrix equation as applications of our main results which demonstrate the significance of our contraction and motivation for such investigations.

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