English

Explicit Artin maps into ${\rm PGL}_2$

Number Theory 2022-03-08 v4

Abstract

Let GG be a subgroup of PGL2(Fq){\rm PGL}_2({\mathbb F}_q), where qq is any prime power, and let QFq[x]Q \in {\mathbb F}_q[x] such that Fq(x)/Fq(Q(x)){\mathbb F}_q(x)/{\mathbb F}_q(Q(x)) is a Galois extension with group GG. By explicitly computing the Artin map on unramified degree-1 primes in Fq(Q){\mathbb F}_q(Q) for various groups GG, interesting new results emerge about finite fields, additive polynomials, and conjugacy classes of PGL2(Fq){\rm PGL}_2({\mathbb F}_q). For example, by taking GG to be a unipotent group, one obtains a new characterization for when an additive polynomial splits completely over Fq{\mathbb F}_q. When G=PGL2(Fq)G = {\rm PGL}_2({\mathbb F}_q), one obtains information about conjugacy classes of PGL2(Fq){\rm PGL}_2({\mathbb F}_q). When GG is the group of order 3 generated by x11/xx \mapsto 1 - 1/x, one obtains a natural tripartite symbol on Fq{\mathbb F}_q with values in Z/3Z{\mathbb Z}/3{\mathbb Z}. Some of these results generalize to PGL2(K){\rm PGL}_2(K) for arbitrary fields KK. Apart from the introduction, this article is written from first principles, with the aim to be accessible to graduate students or advanced undergraduates. An earlier draft of this article was published on the Math arXiv in June 2019 under the title {\it More structure theorems for finite fields}.

Keywords

Cite

@article{arxiv.1906.08944,
  title  = {Explicit Artin maps into ${\rm PGL}_2$},
  author = {Antonia W. Bluher},
  journal= {arXiv preprint arXiv:1906.08944},
  year   = {2022}
}

Comments

Version 4 contains minor corrections and updates to the bibliograpy. Version 3 is a major revision, including a change in the title from "More structure theorems for finite fields" to "Explicit Artin maps into PGL2". The author thanks Xander Faber for insightful comments that led to the change in the title

R2 v1 2026-06-23T09:59:36.346Z