大型二次特征和的分布及其应用

IF 0.9 1区 数学 Q2 MATHEMATICS
Youness Lamzouri
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引用次数: 0

摘要

我们研究了附加于基本判别式 |d|≤x 的原始二次型字符族的字符和最大值的分布。特别是,我们的研究改进了蒙哥马利和沃恩的结果,并有力地证明了贝特曼和乔拉关于二次字符和的欧米茄结果是最优的。对于素数判别式高达 x 的实数字符,我们也得到了类似的结果,并推导出一个有趣的结果,即几乎所有具有大 Legendre 符号和的素数都与 3 modulo 4 全等。我们的结果是受博博、戈尔德马赫、格兰维尔和库库洛普勒斯的最新研究成果启发的,他们为非主字符族模化大素数证明了类似的结果。然而,他们的方法似乎不能推广到其他的 Dirichlet 字符族。相反,我们使用了一种不同的、更精简的方法,它主要依赖于二次大筛。作为应用,我们考虑了蒙哥马利关于 Legendre 符号之和的实在性问题。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
The distribution of large quadratic character sums and applications

We investigate the distribution of the maximum of character sums over the family of primitive quadratic characters attached to fundamental discriminants |d| x. In particular, our work improves results of Montgomery and Vaughan, and gives strong evidence that the Omega result of Bateman and Chowla for quadratic character sums is optimal. We also obtain similar results for real characters with prime discriminants up to x, and deduce the interesting consequence that almost all primes with large Legendre symbol sums are congruent to 3 modulo 4. Our results are motivated by a recent work of Bober, Goldmakher, Granville and Koukoulopoulos, who proved similar results for the family of nonprincipal characters modulo a large prime. However, their method does not seem to generalize to other families of Dirichlet characters. Instead, we use a different and more streamlined approach, which relies mainly on the quadratic large sieve. As an application, we consider a question of Montgomery concerning the positivity of sums of Legendre symbols.

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来源期刊
CiteScore
1.80
自引率
7.70%
发文量
52
审稿时长
6-12 weeks
期刊介绍: ANT’s inclusive definition of algebra and number theory allows it to print research covering a wide range of subtopics, including algebraic and arithmetic geometry. ANT publishes high-quality articles of interest to a broad readership, at a level surpassing all but the top four or five mathematics journals. It exists in both print and electronic forms. The policies of ANT are set by the editorial board — a group of working mathematicians — rather than by a profit-oriented company, so they will remain friendly to mathematicians'' interests. In particular, they will promote broad dissemination, easy electronic access, and permissive use of content to the greatest extent compatible with survival of the journal. All electronic content becomes free and open access 5 years after publication.
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