Multiplier properties for the \(AP\)-Henstock integral

Kwancheol Shin, Ju Han Changwon Yoon
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引用次数: 1

Abstract

In this paper, we investigate some properties of the \(AP\)-Henstock integral on a compact set and prove that the product of an \(AP\)-Henstock integrable function and a function of bounded variation is \(AP\)-Henstock integrable. Furthermore, we prove that the product of an \(AP\)-Henstock integrable function and a regulated function is also \(AP\)-Henstock integrable. We also define the \(AP\)-Henstock integral on an unbounded interval, investigate some properties, and show similar multiplier properties.
\(AP\)-Henstock积分的乘子性质
本文研究了紧集上的(AP)-Henstock积分的一些性质,证明了(AP)-Henstock可积函数与有界变差函数的乘积是(AP)-Henstock可积函数。此外,我们还证明了一个\(AP\)-Henstock可积函数与一个调节函数的乘积也是\(AP\\\\]-Henstoch可积函数。我们还定义了无界区间上的\(AP\)-Henstock积分,研究了一些性质,并给出了类似的乘子性质。
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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10
审稿时长
8 weeks
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