关于\（A^｛\mathcal｛I^｛K｝｝）-可求性

Q3 Mathematics

Ural Mathematical Journal Pub Date : 2022-07-29 DOI:10.15826/umj.2022.1.002

C. Choudhury, S. Debnath

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引用次数: 0

摘要

在本文中，我们引入并研究了\（A^｛\mathcal｛I^｛K｝｝）-可和性的概念，该概念是O.H.~Edely最近（2021）引入的\（A^｛\mathcal{I^｛*｝｝）-可加性的扩展，其中\（A=（A_｛nk｝）_｛n，K=1｝^｛infty｝）是一个非负正则矩阵，\（\mathical｛I｝）和\（\math cal｛K）表示\（\machbb｛n｝）中的两个非平凡可容许理想。我们研究了它的一些基本性质，以及与其他一些已知的可和性方法的一些包含关系。我们证明了\（A^｛\mathcal｛K｝｝）-可和性总是意味着\（A^{\mathcal{I^{K｝}）-可求和性，而\（A^2｛\math cal｛I｝}\）-可加性不一定意味着\。最后，我们给出了一个条件，即\（AP（\mathcal｛I｝，\mathcal{K｝）\）（这是条件\（AP\）的自然推广），在该条件下\（a^｛\mathical｛I｛｝｝）-可和性意味着\（a^{\mathcal｝I^{K｝}\）-可加性。

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ON \(A^{\mathcal{I^{K}}}\)–SUMMABILITY

In this paper, we introduce and investigate the concept of \(A^{\mathcal{I^{K}}}\)-summability as an extension of \(A^{\mathcal{I^{*}}}\)-summability which was recently (2021) introduced by O.H.H.~Edely, where \(A=(a_{nk})_{n,k=1}^{\infty}\) is a non-negative regular matrix and \(\mathcal{I}\) and \(\mathcal{K}\) represent two non-trivial admissible ideals in \(\mathbb{N}\). We study some of its fundamental properties as well as a few inclusion relationships with some other known summability methods. We prove that \(A^{\mathcal{K}}\)-summability always implies \(A^{\mathcal{I^{K}}}\)-summability whereas \(A^{\mathcal{I}}\)-summability not necessarily implies \(A^{\mathcal{I^{K}}}\)-summability. Finally, we give a condition namely \(AP(\mathcal{I},\mathcal{K})\) (which is a natural generalization of the condition \(AP\)) under which \(A^{\mathcal{I}}\)-summability implies \(A^{\mathcal{I^{K}}}\)-summability.

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来源期刊

Ural Mathematical Journal Mathematics-Mathematics (all)

CiteScore

1.30

自引率

0.00%

发文量

审稿时长

16 weeks