Refinements of Artin's primitive root conjecture
Abstract
A famous conjecture of Artin asserts that any integer a that is neither -1 nor a square should be a primitive root (mod p) for a positive proportion of primes p. Moreover, using a heuristic argument, Artin guessed an explicit formula for the proportion; this formula is well-supported by computations and is known to hold on a generalized Riemann hypothesis, but remains open. In this paper we propose several conjectures that capture the finer properties of the distribution of the order of a (mod p) as p varies over primes; these assertions contain Artin's original conjecture as a special case. We prove these conjectures assuming the generalized Riemann hypothesis, as well as weaker versions unconditionally.
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