English

Bounded gaps between prime polynomials with a given primitive root

Number Theory 2015-04-16 v2

Abstract

A famous conjecture of Artin states that there are infinitely many prime numbers for which a fixed integer gg is a primitive root, provided g1g \neq -1 and gg is not a perfect square. Thanks to work of Hooley, we know that this conjecture is true, conditional on the truth of the Generalized Riemann Hypothesis. Using a combination of Hooley's analysis and the techniques of Maynard-Tao used to prove the existence of bounded gaps between primes, Pollack has shown that (conditional on GRH) there are bounded gaps between primes with a prescribed primitive root. In the present article, we provide an unconditional proof of the analogue of Pollack's work in the function field case; namely, that given a monic polynomial g(t)g(t) which is not an vvth power for any prime vv dividing q1q-1, there are bounded gaps between monic irreducible polynomials P(t)P(t) in Fq[t]\mathbb{F}_q[t] for which g(t)g(t) is a primitive root (which is to say that g(t)g(t) generates the group of units modulo P(t)P(t)). In particular, we obtain bounded gaps between primitive polynomials, corresponding to the choice g(t)=tg(t) = t.

Keywords

Cite

@article{arxiv.1503.06634,
  title  = {Bounded gaps between prime polynomials with a given primitive root},
  author = {Lee Troupe},
  journal= {arXiv preprint arXiv:1503.06634},
  year   = {2015}
}
R2 v1 2026-06-22T08:59:30.211Z