On the convergence difference sequences and the related operator norms

Pub Date : 2020-11-01 DOI:10.2478/ausm-2020-0016
P. Baliarsingh, L. Nayak, S. Samantaray
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引用次数: 1

Abstract

Abstract In this note, we discuss the definitions of the difference sequences defined earlier by Kızmaz (1981), Et and Çolak (1995), Malkowsky et al. (2007), Başar (2012), Baliarsingh (2013, 2015) and many others. Several authors have defined the difference sequence spaces and studied their various properties. It is quite natural to analyze the convergence of the corresponding sequences. As a part of this work, a convergence analysis of difference sequence of fractional order defined earlier is presented. It is demonstrated that the convergence of the fractional difference sequence is dynamic in nature and some of the results involved are also inconsistent. We provide certain stronger conditions on the primary sequence and the results due to earlier authors are substantially modified. Some illustrative examples are provided for each point of the modifications. Results on certain operator norms related to the difference operator of fractional order are also determined.
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差分序列的收敛性及其算子范数
在本文中,我们讨论了Kızmaz(1981)、Et和Çolak(1995)、Malkowsky等人(2007)、ba(2012)、Baliarsingh(2013、2015)等人之前定义的差异序列的定义。一些作者定义了差分序列空间,并研究了它们的各种性质。分析相应序列的收敛性是很自然的。作为这项工作的一部分,给出了先前定义的分数阶差分序列的收敛性分析。证明了分数阶差分序列的收敛本质上是动态的,而且其中一些结果也不一致。我们提供了一些更强的条件,并对先前作者的结果进行了实质性的修正。对每一点的修改都提供了一些说明性的例子。并给出了与分数阶差分算子有关的若干算子范数的结果。
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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