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Main Author: Shengyu, Kang
Format: Preprint
Published: 2026
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Online Access:https://arxiv.org/abs/2605.01682
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author Shengyu, Kang
author_facet Shengyu, Kang
contents Let \(C(x)\), \(A(x)\), and \(N(x)\) denote the counting functions of cyclic, abelian, and nilpotent numbers not exceeding \(x\), respectively. Their asymptotic formulas have been established in recent work by Pollack and Just. In this paper, by adapting the methods of Pollack and Just, we study the distribution of these numbers in Beatty sequences \(\mathcal{B}_{α,β} = ([αn + β])_{n=1}^{\infty}\), where \(α> 1\) is an irrational number of finite type and \(β\) is a fixed real number. We prove that the counting functions \(\#C^*(x)\), \(\#A^*(x)\), and \(\#N^*(x)\) for cyclic, abelian, and nilpotent numbers in Beatty sequences satisfy asymptotic formulas that differ from those of Pollack and Just only by a factor \(1/α\).
format Preprint
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institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Numbers in a Beatty sequence which are orders only of cyclic, abelian or nilpotent groups
Shengyu, Kang
Number Theory
11N37
Let \(C(x)\), \(A(x)\), and \(N(x)\) denote the counting functions of cyclic, abelian, and nilpotent numbers not exceeding \(x\), respectively. Their asymptotic formulas have been established in recent work by Pollack and Just. In this paper, by adapting the methods of Pollack and Just, we study the distribution of these numbers in Beatty sequences \(\mathcal{B}_{α,β} = ([αn + β])_{n=1}^{\infty}\), where \(α> 1\) is an irrational number of finite type and \(β\) is a fixed real number. We prove that the counting functions \(\#C^*(x)\), \(\#A^*(x)\), and \(\#N^*(x)\) for cyclic, abelian, and nilpotent numbers in Beatty sequences satisfy asymptotic formulas that differ from those of Pollack and Just only by a factor \(1/α\).
title Numbers in a Beatty sequence which are orders only of cyclic, abelian or nilpotent groups
topic Number Theory
11N37
url https://arxiv.org/abs/2605.01682