English

Average $r$-rank Artin Conjecture

Number Theory 2015-08-13 v2

Abstract

Let ΓQ\Gamma\subset\mathbb{Q}^* be a finitely generated subgroup and let pp be a prime such that the reduction group Γp\Gamma_p is a well defined subgroup of the multiplicative group Fp\mathbb{F}_p^*. We prove an asymptotic formula for the average of the number of primes pxp\le x for which the index [Fp:Γp]=m[\mathbb{F}_p^*:\Gamma_p]=m. The average is performed over all finitely generated subgroups Γ=a1,,arQ\Gamma=\langle a_1,\dots,a_r \rangle\subset\mathbb{Q}^*, with aiZa_i\in\mathbb{Z} and aiTia_i\le T_i with a range of uniformity: Ti>exp(4(logxloglogx)12)T_i>\exp(4(\log x \log\log x)^{\frac{1}{2}}) for every i=1,,ri=1,\dots,r. We also prove an asymptotic formula for the mean square of the error terms in the asymptotic formula with a similar range of uniformity. The case of rank 11 and m=1m=1 corresponds to the classical Artin conjecture for primitive roots and has already been considered by Stephens in 1969.

Keywords

Cite

@article{arxiv.1504.01554,
  title  = {Average $r$-rank Artin Conjecture},
  author = {Cihan Pehlivan and Lorenzo Menici},
  journal= {arXiv preprint arXiv:1504.01554},
  year   = {2015}
}
R2 v1 2026-06-22T09:11:32.202Z