On Artin's Conjecture for Rank One Drinfeld Modules

For any finitely generated subgroup 1 of Q\* we compute a formula for the density of the primes for which the reduction modulo p of 1 contains a primitive root modulo p. We use this to conjecture a characterization of ``optimal'' subgroups (i.e., subgroups that have maximal density). We also improve

Let a be an integer { &1 and not a square. Let P a (x) be the number of primes up to x for which a is a primitive root. Goldfeld and Stephens proved that the average value of P a (x) is about a constant multiple of xÂln x. Carmichael extended the definition of primitive roots to that of primitive \*

We prove an unconditional analog of Artin's conjecture for the function field of a curve over a finite field. 1 teys Acadumic Press. fnc.

Let \(k\) be a global function field with constant field \(\mathbb{F}_{q}\). Let \(\infty\) be a place of \(k\) and let \(\mathbb{c}_{k}\) be the ring of functions regular outside of \(\propto\). Once a sign function has been chosen, one can define a discriminant function on the set of rank 1 Drinfe

Let = be a fundamental unit in a real quadratic field and let S be the set of rational primes p for which = has maximal order modulo p. Under the assumption of the generalized Riemann hypothesis, we show that S has a density $(S)=c } A in the set of all rational primes, where A is Artin's constant a