On the influence of the Galois group structure on the Chebyshev bias in number fields

Mounir Hayani

Type: Preprint

Publication Date: 2024-04-09

Citations: 0

Abstract

In this paper we produce unconditionally new instances of Galois number field extensions exhibiting strong discrepancies in the distribution of Frobenius elements among conjugacy classes of the Galois group. We first prove an inverse Galois theoretic statement showing a dichotomy between ``extreme Chebyshev biases'' and ``equal prime ideal counting''. We further introduce a group theoretic property that implies extreme biases. In the case of abelian extensions this leads to a complete characterization of Galois groups enabling extreme biases. In the case where the Galois group is a $p$-group, a simple criterion is deduced for the existence of extreme biases, and associated effective statements of Linnik type are obtained.

Locations

arXiv (Cornell University) - View - PDF

Similar Works

Action	Title	Year	Authors
+	Chebyshevʼs bias in Galois extensions of global function fields	2011	Byungchul Cha Bo‐Hae Im
+ PDF Chat	Chebyshev's bias in dihedral and generalized quaternion Galois groups	2021	Alexandre Bailleul
+ PDF Chat	Chebyshev’s bias in dihedral and generalized quaternion Galois groups	2021	Alexandre Bailleul
+	Exceptional biases in counting primes over functions fields	2023	Alexandre Bailleul Lucile Devin Daniel Keliher Wanlin Li
+	Exceptional biases in counting primes over function fields	2024	Alexandre Bailleul Lucile Devin Daniel Keliher Wanlin Li
+	Chebyshev's Bias against Splitting and Principal Primes in Global Fields	2022	Miho Aoki Shin-ya Koyama
+ PDF Chat	Chebyshev's bias against splitting and principal primes in global fields	2022	Miho Aoki Shin-ya Koyama
+	A New Aspect of Chebyshev's Bias for Elliptic Curves over Function Fields	2022	Ikuya Kaneko Shin-ya Koyama
+	On the average congruence class bias for cyclicity and divisibility of the groups of $\mathbb{F}_p$-points of elliptic curves	2023	Sung‐Min Lee
+ PDF Chat	Unconditional Chebyshev biases in number fields	2022	Daniel Fiorilli Florent Jouve
+	Chebyshev's Bias	1994	Michael Rubinstein Peter Sarnak
+ PDF Chat	Chebyshev’s bias in function fields	2008	Byungchul Cha
+ PDF Chat	Highly biased prime number races	2014	Daniel Fiorilli
+	A new aspect of Chebyshev’s bias for elliptic curves over function fields	2023	Ikuya Kaneko Shin-ya Koyama
+ PDF Chat	The bias conjecture for elliptic curves over finite fields and Hurwitz class numbers in arithmetic progressions	2024	Ben Kane Sudhir Pujahari Zichen Yang
+ PDF Chat	Arithmetic statistics of Galois groups	2019	Alin Bostan Xavier Caruso Gilles Christol Philippe Dumas
+ PDF Chat	Chebyshev’s bias for analytic<i>L</i>-functions	2019	Lucile Devin
+	Extreme biases in prime number races with many contestants	2017	Kevin R. Ford Adam J. Harper Youness Lamzouri
+	Extreme biases in prime number races with many contestants	2017	Kevin Ford Adam J. Harper Youness Lamzouri
+ PDF Chat	Extreme biases in prime number races with many contestants	2019	Kevin Ford Adam J. Harper Youness Lamzouri

Works That Cite This (1)

Action	Title	Year	Authors
+	An annotated bibliography for comparative prime number theory	2025	Greg Martin Pu Justin Scarfy Yang Aram Bahrini Prajeet Bajpai Kübra Benli̇ Jenna Downey Yuan Yuan Li Xiaoxuan Liang Amir Parvardi Reginald Simpson

Works Cited by This (0)

Action	Title	Year	Authors