Uniform bounds for the density in Artin's conjecture on primitive roots

Abstract

We consider Artin's conjecture on primitive roots over a number field K, reducing an algebraic number α∈ K×. Under the Generalised Riemann Hypothesis, there is a density dens(α) counting the proportion of the primes of K for which α is a primitive root. This density dens(α) is a rational multiple of an Artin constant A(τ) that depends on the largest integer τ≥ 1 such that α∈ (K×)τ. The aim of this paper is bounding the ratio dens(α)/A(τ), under the assumption that dens(α)≠ 0. Over Q, this ratio is between 2/3 and 2, these bounds being optimal. For a general number field K we provide upper and lower bounds that only depend on K.