Wijsman空间\(\mu \) -Deferred Cesàro i - Order (a, b)集合序列的统计收敛性

IF 0.8 4区 综合性期刊 Q3 MULTIDISCIPLINARY SCIENCES Proceedings of the National Academy of Sciences, India Section A: Physical Sciences Pub Date : 2023-03-09 DOI:10.1007/s40010-023-00816-0
Vakeel A Khan, Izhar Ali Khan, Bipan Hazarika
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引用次数: 0

摘要

本文给出了可分离度量空间的闭集序列\((\mathcal {X},\rho )\)的Wijsman强理想\(r-\)递延Cesàro可和性和Wijsman \(\mu \) -递延Cesàro i -与模函数f相关的阶(a, b)统计收敛性的概念。我们还分别定义了它们各自的序列空间\( \left[ {{\text{DC}}\left[ {p,q} \right]_{W}^{{(a,b)}} (r,f)} \right]^{I} \)和\( \left[ {_{\mu } {\text{DS}}\left[ {p,q} \right]_{W}^{{(a,b)}} \left( f \right)} \right]^{I} \)。我们还证明了对于\(a\le b\),新形成的序列空间是定义良好的,而对于\( a>b \),上述空间一般不是定义良好的。建立了一些基于包含关系的结果,并给出了一些反例来支持我们的结果。最后,证明了如果一个闭集有界序列是Wijsman \(\mu \) -deferred Cesàro i -阶(a, b)的统计收敛,则它不必是Wijsman强理想\(r-\) -deferred Cesàro可和的。
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Space of Wijsman \(\mu \)-Deferred Cesàro I-Statistically Convergent of Order (a, b) Set Sequence

In this paper, we present the notions of Wijsman strongly ideal \(r-\)deferred Cesàro summability and Wijsman \(\mu \)-deferred Cesàro I-statistical convergence of order (ab) allied with modulus function f for a sequence of closed sets of a separable metric space \((\mathcal {X},\rho )\). We also define their respective sequence spaces \( \left[ {{\text{DC}}\left[ {p,q} \right]_{W}^{{(a,b)}} (r,f)} \right]^{I} \) and \( \left[ {_{\mu } {\text{DS}}\left[ {p,q} \right]_{W}^{{(a,b)}} \left( f \right)} \right]^{I} \), respectively. We also prove that for \(a\le b\), the newly formed sequence space is well defined but for \( a>b \), foresaid space is not well defined in general. Some inclusion relation-based results are also established with some counterexamples to support our results. At last, it is shown that if a bounded sequence of closed sets is Wijsman \(\mu \)-deferred Cesàro I-statistical convergence of order (ab), then it need not be Wijsman strongly ideal \(r-\)deferred Cesàro summable.

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来源期刊
CiteScore
2.60
自引率
0.00%
发文量
37
审稿时长
>12 weeks
期刊介绍: To promote research in all the branches of Science & Technology; and disseminate the knowledge and advancements in Science & Technology
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