论铃木$-$普罗维诺夫$\mathpzc{Z^}_{\aE^}^{\aR}(\alpha)-$模态$b-$度量空间中的牵引力

Communications in advanced mathematical sciences Pub Date : 2024-02-13 DOI:10.33434/cams.1414411

Abdurrahman Büyükkaya, M. Öztürk

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引用次数: 0

摘要

本文通过考虑 ${{mathcal C}_\mathcal{A}}-$simulation function 和 Proinov type function，建立了一种新的收缩映射，即 Suzuki$-$Proinov $\mathpzc{Z^*}_{\aE^*}^{\aR}(\alpha)-$contraction ，它包括有二次项的有理表达式和 $\aE-$type contraction。此外，我们还通过在模态 $b-$metric 空间中具有三角 $\alpha-$ 可容许性的映射证明了一个公共定点定理。除此之外，我们还通过主定理取得了一些新成果，对目前文献中的成果做出了贡献。作为应用，我们研究了动态编程中出现的一类函数方程的解的存在性。

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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On Suzuki$-$Proinov $\mathpzc{Z^*}_{\aE^*}^{\aR}(\alpha)-$Contraction in Modular $b-$Metric Spaces

In this paper, by taking ${{\mathcal C}_\mathcal{A}}-$simulation function and Proinov type function into account, we set up a new contraction mapping, which is referred to as Suzuki$-$Proinov $\mathpzc{Z^*}_{\aE^*}^{\aR}(\alpha)-$contraction and including both rational expressions that have quadratic terms and $\aE-$type contraction. Furthermore, we demonstrate a common fixed point theorem through the mappings endowed with triangular $\alpha-$admissibility in the setting of modular $b-$metric space. Besides that, we achieve some new outcomes that contribute to the current ones in the literature through the main theorem, and, as an application, we examine the existence of solutions to a class of functional equations emerging in dynamic programming.

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来源期刊

Communications in advanced mathematical sciences

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论铃木$-$普罗维诺夫$\mathpzc{Z^*}_{\aE^*}^{\aR}(\alpha)-$模态$b-$度量空间中的牵引力

摘要

论铃木$-$普罗维诺夫$\mathpzc{Z^}_{\aE^}^{\aR}(\alpha)-$模态$b-$度量空间中的牵引力