On the number of prime factors with a given multiplicity over h-free and h-full numbers

Pub Date : 2024-09-23 DOI:10.1016/j.jnt.2024.08.007
Sourabhashis Das, Wentang Kuo, Yu-Ru Liu
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引用次数: 0

Abstract

Let k and n be natural numbers. Let ωk(n) denote the number of distinct prime factors of n with multiplicity k as studied by Elma and the third author [5]. We obtain asymptotic estimates for the first and the second moments of ωk(n) when restricted to the set of h-free and h-full numbers. We prove that ω1(n) has normal order loglogn over h-free numbers, ωh(n) has normal order loglogn over h-full numbers, and both of them satisfy the Erdős-Kac Theorem. Finally, we prove that the functions ωk(n) with 1<k<h do not have normal order over h-free numbers and ωk(n) with k>h do not have normal order over h-full numbers.
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关于在无h和满h数中具有给定倍数的质因数个数
设 k 和 n 都是自然数。让 ωk(n)表示乘数为 k 的 n 的不同质因数的个数,如 Elma 和第三作者所研究的那样[5]。我们得到了ωk(n)的第一矩和第二矩的渐近估计值,并将其限制在无 h 和满 h 的数集合中。我们证明ω1(n) 在 h 个无穷数上有正序 loglogn,ωh(n) 在 h 个满数上有正序 loglogn,而且它们都满足厄尔多斯-卡克定理。最后,我们证明含 1<k<h 的函数 ωk(n) 在无 h 数上没有正序,含 k>h 的函数 ωk(n) 在满 h 数上没有正序。
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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