The variance and correlations of the divisor function in $${\mathbb {F}}_q [T]$$ , and Hankel matrices

IF 1.2 3区数学 Q1 MATHEMATICS

Research in the Mathematical Sciences Pub Date : 2024-02-17 DOI:10.1007/s40687-023-00418-7

Michael Yiasemides

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引用次数: 0

Abstract

We prove an exact formula for the variance of the divisor function over short intervals in ${\mathcal {A}}:= {\mathbb {F}}_q [T]$, where q is a prime power; and for correlations of the form $d(A) d(A+B)$, where we average both A and B over certain intervals in ${\mathcal {A}}$. We also obtain an exact formula for correlations of the form $d(KQ+N) d (N)$, where Q is prime and K and N are averaged over certain intervals with ${{\,\textrm{deg}\,}}N \le {{\,\textrm{deg}\,}}Q -1 \le {{\,\textrm{deg}\,}}K$; and we demonstrate that $d(KQ+N)$ and d(N) are uncorrelated. We generalize our results to $\sigma _z$ defined by $\sigma _z (A):= \sum _{E \mid A} |A |^z$ for all monics $A \in {\mathcal {A}}$. Our approach is to use the orthogonality relations of additive characters on ${\mathbb {F}}_q$ to translate the problems to ones involving the ranks of Hankel matrices over ${\mathbb {F}}_q$. We prove several results regarding the rank and kernel structure of these matrices, thus demonstrating their number-theoretic properties. We also discuss extending our method to other divisor sums, such as those involving $d_k$.

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$${mathbb {F}}_q [T]$$ 中除数函数的方差和相关性，以及汉克尔矩阵

我们证明了除数函数在 ${\mathcal {A}}:= {\mathbb {F}}_q [T]$ 短区间上的方差的精确公式，其中 q 是质数幂；以及 $d(A) d(A+B)$ 形式的相关性的精确公式，其中我们将 A 和 B 在 ${\mathcal {A}}$ 的一定区间上平均。我们还得到了形式为 $d(KQ+N) d (N)$ 的相关性的精确公式，其中 Q 是质数，K 和 N 在一定区间内的平均值为 ${{\textrm{deg}\,}}N \le {{\textrm{deg}\,}}Q -1 \le {{\textrm{deg}\,}}K$；并且我们证明 $d(KQ+N)$ 和 d(N) 是不相关的。我们将结果推广到 $\sigma _z (A):= \sum _{E \mid A} 定义的 \(\sigma _z (A):= \sum _{E \mid A})|A|^z$定义的。我们的方法是利用${\mathbb {F}}_q$ 上加法字符的正交关系，将问题转化为涉及${\mathbb {F}}_q$ 上汉克尔矩阵秩的问题。我们证明了关于这些矩阵的秩和核结构的几个结果，从而证明了它们的数论性质。我们还讨论了将我们的方法扩展到其他除数和的问题，比如那些涉及到 $d_k$ 的除数和。

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来源期刊

Research in the Mathematical Sciences Mathematics-Computational Mathematics

CiteScore

2.00

自引率

8.30%

发文量

期刊介绍： Research in the Mathematical Sciences is an international, peer-reviewed hybrid journal covering the full scope of Theoretical Mathematics, Applied Mathematics, and Theoretical Computer Science. The Mission of the Journal is to publish high-quality original articles that make a significant contribution to the research areas of both theoretical and applied mathematics and theoretical computer science. This journal is an efficient enterprise where the editors play a central role in soliciting the best research papers, and where editorial decisions are reached in a timely fashion. Research in the Mathematical Sciences does not have a length restriction and encourages the submission of longer articles in which more complex and detailed analysis and proofing of theorems is required. It also publishes shorter research communications (Letters) covering nascent research in some of the hottest areas of mathematical research. This journal will publish the highest quality papers in all of the traditional areas of applied and theoretical areas of mathematics and computer science, and it will actively seek to publish seminal papers in the most emerging and interdisciplinary areas in all of the mathematical sciences. Research in the Mathematical Sciences wishes to lead the way by promoting the highest quality research of this type.