Counting integer polynomials with several roots of maximal modulus

arXiv - MATH - Number Theory Pub Date : 2024-09-13 DOI:arxiv-2409.08625
Artūras Dubickas, Min Sha
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Abstract

In this paper, for positive integers $H$ and $k \leq n$, we obtain some estimates on the cardinality of the set of monic integer polynomials of degree $n$ and height bounded by $H$ with exactly $k$ roots of maximal modulus. These include lower and upper bounds in terms of $H$ for fixed $k$ and $n$. We also count reducible and irreducible polynomials in that set separately. Our results imply, for instance, that the number of monic integer irreducible polynomials of degree $n$ and height at most $H$ whose all $n$ roots have equal moduli is approximately $2H$ for odd $n$, while for even $n$ there are more than $H^{n/8}$ of such polynomials.
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计算有多个最大模根的整数多项式
在本文中,对于正整数 $H$ 和 $k \leq n$,我们得到了阶数为$n$、高为 $H$、最大模正好为 $k$ 的单整多项式集合的一些估计值。其中包括在固定 $k$ 和 $n$ 条件下,以 $H$ 为单位的下界和上界。我们还分别计算了该集合中的可还原多项式和不可还原多项式。例如,我们的结果表明,对于奇数$n$,所有$n$根的模数相等的度数为$n$、高最多为$H$的单整不可还原多项式的数目约为$2H$,而对于偶数$n$,此类多项式的数目超过$H^{n/8}$。
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arXiv - MATH - Number Theory
arXiv - MATH - Number Theory
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