四维矩阵映射及其应用

Kuwait Journal of Science & Engineering Pub Date : 2022-04-02 DOI:10.48129/kjs.17649

Mehmet Ali Sarıg¨ol

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引用次数: 2

摘要

本文刻画了所有四维无限矩阵的类(L,Lk)、(Lk,L)和(L∞，Lk)， 1≤k <∞，其中Lk和L∞分别是所有绝对k可和和有界二重序列的空间。利用它们，我们建立了N、pn、qn与N、p′N、q′k可和性方法之间的关系，将Bosanquet(1950)、Sarıg¨ol(1993)、Sarıg¨ol与Bor(1995)、Sunouchi(1949)的一些结果推广到双可和性方法，并给出了单可和性方法与双可和性方法之间的关系。

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Four dimensional matrix mappings and applications

In this paper, we characterize the classes (L,Lk) , (Lk,L) and (L∞,Lk) , 1 ≤ k < ∞, of all four dimensional infinite matrices, where Lk and L∞ are the spaces of all absolutely k-summable and bounded double sequences, respectively. Using them, we establish some relations between N, pn, qn and N, p′ n, q′n k summability methods which extend some results of Bosanquet (1950), Sarıg¨ol (1993), Sarıg¨ol and Bor (1995), and Sunouchi (1949) to double summability methods, and give a relation between single and double summability methods.

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来源期刊

Kuwait Journal of Science & Engineering MULTIDISCIPLINARY SCIENCES-

自引率

0.00%

发文量

审稿时长

3 months