双序列求和加权平均法的一些陶伯定理

Pub Date : 2024-02-20 DOI:10.1007/s11253-024-02272-4

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引用次数: 0

摘要

让 p = (pj) 和 q = (qk) 都是非负数的实数序列，其性质是：(\begin{array}{ccccccc}{P}_{m}=\sum_{j=0}^{m}{p}_{j}/ne 0&；{text{and}}& {Q}_{m}=\sum_{k=0}^{n}{q}_{k}\ne 0& \mathrm{for all}& m& {\text{and}}& n.\end{array}\) 另让（Pm）和（Qn）是有规律变化的正指数。假设 (umn) 是复数（实数）的双序列，它是（（（overline{N }\ ），p，q；α，β）可求和的，并且有一个有限的极限，其中 (α, β) = (1，1)，(1，0) 或 (0，1)。我们提出了一些权重条件，在这些条件下，(umn) 在普林塞姆意义上收敛。这些结果概括并扩展了作者在[《计算数学应用》，第 62 期，第 6 号，2609-2615 (2011)]中获得的结果。

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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Some Tauberian Theorems for the Weighted Mean Method of Summability of Double Sequences

Let p = (p_j) and q = (q_k) be real sequences of nonnegative numbers with the property that

\(\begin{array}{ccccccc}{P}_{m}=\sum_{j=0}^{m}{p}_{j}\ne 0& {\text{and}}& {Q}_{m}=\sum_{k=0}^{n}{q}_{k}\ne 0& \mathrm{for all}& m& {\text{and}}& n.\end{array}\)

Also let (P_m) and (Q_n) be regularly varying positive indices. Assume that (u_mn) is a double sequence of complex (real) numbers, which is ( \(\overline{N }\) , p, q; α, β)-summable and has a finite limit, where (α, β) = (1, 1), (1, 0), or (0, 1). We present some conditions imposed on the weights under which (u_mn) converges in Pringsheim’s sense. These results generalize and extend the results obtained by the authors in [Comput. Math. Appl., 62, No. 6, 2609–2615 (2011)].

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