D_p^q(∆^+r)-统计收敛

IF 0.5 Q3 MATHEMATICS

Facta Universitatis-Series Mathematics and Informatics Pub Date : 2020-05-28 DOI:10.22190/FUMI2002405B

Neslihan Boztaş, M. Küçükaslan

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引用次数: 0

摘要

设p(n)和q(n)是正整数的非递减序列，使得p(n) < q(n)且limn→∞q(n) =∞成立。对于任意r∈Z^+，我们定义D_p,q^+r-∆^+r x的统计收敛性，其中∆^+r为r-序列(x_n)的差。本文的主要结果在于确定了形式为[D_p^q]_0 α的序列χ和χ'的集合满足χ∧[D_p^q]_0(∆^+r)∧χ'，以及形式为[D_p^q]_α的集合φ和φ'满足φ≤[D_p^q]_∞(∆^+r)≤φ'。

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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THE D_p^q (∆^+r )-STATISTICAL CONVERGENCE

Let p(n) and q(n) be nondecreasing sequence of positive integers such that p(n) < q(n) and limn→∞ q(n) = ∞ holds. For any r ∈ Z^+, we define D_p,q^+r- statistical convergence of ∆^+r x where ∆^+r is r- th difference of the sequence (x_n). The main results in this paper consist in determining sets of sequences χ and χ' of the form [D_ p^q]_0 α satisfying χ ⊂ [D_p^q]_0(∆^+r ) ⊂ χ ' and sets φ and φ' of the form [D_p^q]_α satisfying φ ≤ [D_p^q]_∞(∆^+r ) ≤ φ' .

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Facta Universitatis-Series Mathematics and Informatics MATHEMATICS-

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