On the derivatives of the integer-valued polynomials

Bakir Farhi
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引用次数: 3

Abstract

In this paper, we study the derivatives of an integer-valued polynomial of a given degree. Denoting by $E_n$ the set of the integer-valued polynomials with degree $\leq n$, we show that the smallest positive integer $c_n$ satisfying the property: $\forall P \in E_n, c_n P' \in E_n$ is $c_n = \mathrm{lcm}(1 , 2 , \dots , n)$. As an application, we deduce an easy proof of the well-known inequality $\mathrm{lcm}(1 , 2 , \dots , n) \geq 2^{n - 1}$ ($\forall n \geq 1$). In the second part of the paper, we generalize our result for the derivative of a given order $k$ and then we give two divisibility properties for the obtained numbers $c_{n , k}$ (generalizing the $c_n$'s). Leaning on this study, we conclude the paper by determining, for a given natural number $n$, the smallest positive integer $\lambda_n$ satisfying the property: $\forall P \in E_n$, $\forall k \in \mathbb{N}$: $\lambda_n P^{(k)} \in E_n$. In particular, we show that: $\lambda_n = \prod_{p \text{ prime}} p^{\lfloor\frac{n}{p}\rfloor}$ ($\forall n \in \mathbb{N}$).
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关于整数值多项式的导数
本文研究了给定阶的整数值多项式的导数。用$E_n$表示次为$\leq n$的整值多项式的集合,我们证明了满足性质$\forall P \in E_n, c_n P' \in E_n$的最小正整数$c_n$是$c_n = \mathrm{lcm}(1 , 2 , \dots , n)$。作为一个应用,我们推导出了一个众所周知的不等式$\mathrm{lcm}(1 , 2 , \dots , n) \geq 2^{n - 1}$ ($\forall n \geq 1$)的简单证明。在论文的第二部分,我们推广了给定阶导数$k$的结果,然后给出了所得数$c_{n , k}$的两个可整除性质(推广了$c_n$的性质)。根据这一研究,我们通过确定给定自然数$n$满足性质:$\forall P \in E_n$, $\forall k \in \mathbb{N}$: $\lambda_n P^{(k)} \in E_n$的最小正整数$\lambda_n$来总结本文。特别地,我们显示:$\lambda_n = \prod_{p \text{ prime}} p^{\lfloor\frac{n}{p}\rfloor}$ ($\forall n \in \mathbb{N}$)。
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来源期刊
CiteScore
0.80
自引率
20.00%
发文量
14
期刊最新文献
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