On an Asymptotic Property of Divisor  τ -Function

T. Hakobyan; S. Vostokov

doi:10.1134/S1995080218010134

On an Asymptotic Property of Divisor τ-Function

Authors: Hakobyan T.¹, Vostokov S.¹
Affiliations:
1. St. Petersburg State University
Issue: Vol 39, No 1 (2018)
Pages: 77-83
Section: Article
URL: https://journals.rcsi.science/1995-0802/article/view/200909
DOI: https://doi.org/10.1134/S1995080218010134
ID: 200909

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Abstract
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Abstract

In this paper for μ > 0 we study an asymptotic behavior of the sequence defined as T_n(μ) = (τ(n))⁻¹\({\max _{1 \leqslant t \leqslant \left[ {{n^{1/\mu }}} \right]}}\) {τ(n + t)}, where τ(n) denotes the number of natural divisors of given positive integer n. The motivation of this observation is to explore whether τ-function oscillates rapidly.

Keywords

τ-function, divisor, Stirling’s formula, Prime Number Theorem, Derichlet’s divisor problem

About the authors

T. Hakobyan

St. Petersburg State University

Author for correspondence.
Email: tigran19931026@gmail.com
Russian Federation, Universitetskaya nab. 7/9, St. Petersburg, 199034

S. Vostokov