A class of solutions of the equation d(n2) = d(φ(n))

IF 0.4 Q4 MATHEMATICS Notes on Number Theory and Discrete Mathematics Pub Date : 2023-05-02 DOI:10.7546/nntdm.2023.29.2.284-309

Zahra Amroune, D. Bellaouar, Abdelmadjid Boudaoud

引用次数: 0

Abstract

For any positive integer $n$ let $d\left( n\right) $ and $\varphi \left( n\right) $ be the number of divisors of $n$ and the Euler's phi function of $n$, respectively. In this paper we present some notes on the equation $d\left( n^{2}\right) =d\left( \varphi \left( n\right) \right).$ In fact, we characterize a class of solutions that have at most three distinct prime factors. Moreover, we show that Dickson's conjecture implies that $d\left( n^{2}\right) =d\left( \varphi \left( n\right) \right) $ infinitely often.

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方程d(n2) = d(φ(n))的一类解

对于任意正整数$n$，设$d\left( n\right) $和$\varphi \left( n\right) $分别为$n$和$n$的欧拉函数的除数。在本文中，我们给出了关于方程$d\left( n^{2}\right) =d\left( \varphi \left( n\right) \right).$的一些注意事项。事实上，我们刻画了一类至多有三个不同素数因子的解。此外，我们还证明了Dickson猜想暗示$d\left( n^{2}\right) =d\left( \varphi \left( n\right) \right) $无限频繁。

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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Notes on Number Theory and Discrete Mathematics MATHEMATICS-

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