English

On Artin's Primitive Root Conjecture for Function Fields over $\mathbb{F}_{q}$

Number Theory 2023-07-19 v2 Algebraic Geometry

Abstract

In 1927, E. Artin proposed a conjecture for the natural density of primes pp for which gg generates (Z/pZ)×(\mathbb{Z}/p\mathbb{Z})^\times. By carefully observing numerical deviations from Artin's originally predicted asymptotic, Derrick and Emma Lehmer (1957) identified the need for an additional correction factor; leading to a modified conjecture which was eventually proved to be correct by Hooley (1967) under the assumption of the generalised Riemann hypothesis. An appropriate analogue of Artin's primitive root conjecture may moreover be formulated for an algebraic function field KK of rr variables over Fq\mathbb{F}_{q}. Relying on a soon to be established theorem of Weil (1948), Bilharz (1937) provided a proof in the particular case that KK is a global function field (i.e. r=1r=1), which is correct under the assumption that gKg \in K is a geometric\textit{geometric} element. Under these same assumptions, Pappalardi and Shparlinski (1995) established a quantitative version of Bilharz's result. In this paper we build upon these works by both generalizing to function fields in rr variables over Fq\mathbb{F}_{q} and removing the assumption that gKg \in K is geometric; thereby completing a proof of Artin's primitive root conjecture for function fields over Fq\mathbb{F}_{q}. In doing so, we moreover identify an interesting correction factor which emerges when gg is not geometric. A crucial feature of our work is an exponential sum estimate over varieties that we derive from Weil's Theorem.

Cite

@article{arxiv.2306.04297,
  title  = {On Artin's Primitive Root Conjecture for Function Fields over $\mathbb{F}_{q}$},
  author = {Leonhard Hochfilzer and Ezra Waxman},
  journal= {arXiv preprint arXiv:2306.04297},
  year   = {2023}
}

Comments

26 pages; minor revisions

R2 v1 2026-06-28T10:58:38.915Z