无平方奇整数部分子基序列上算术函数卷积的代数性质

Q1 Engineering

International Journal of Applied Engineering Research (Netherlands) Pub Date : 2021-01-30 DOI:10.37622/IJAER/16.1.2021.67-74

K. Sridevi

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引用次数: 0

摘要

本文在无平方奇整数的子集上引入了偏子基序列的概念，利用从无平方正整数集到实数的算术函数的卷积定义，得到了卷积的一些基本代数性质。我们还定义了关于偏基序列的偏乘法函数，并得到了它们的性质。这些结果推广了Sridevi[7]中关于算术函数的结果，因此本文是Sridevi[7]的续篇。

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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Algebraic Properties of Convolution of Arithmetic Functions on the Partial Sub-Basic Sequence of Square-Free Odd Integers

In this paper, we introduce the notion of partial sub-basic sequence on the sub set of square-free odd integers and using convolution definition of arithmetic functions from the set of square free positive integers to real numbers and obtain some basic algebraic properties of convolution. We also define partial multiplicative functions with respect to partial basic sequences and obtain their properties. These results are extended the results given in Sridevi [7] relating to the arithmetic functions, thus this paper is a sequel to Sridevi [7].

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International Journal of Applied Engineering Research (Netherlands) Engineering-Engineering (all)

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