Resolving Grosswald's conjecture on GRH
Abstract
In this paper we examine Grosswald's conjecture on g(p), the least primitive root modulo p. Assuming the Generalized Riemann Hypothesis (GRH), and building on previous work by Cohen, Oliveira e Silva and Trudgian, we resolve Grosswald's conjecture by showing that g(p)< p - 2 for all p>409. Our method also shows that under GRH we have g(p)< p-2 for all p>2791, where g(p) is the least prime primitive root modulo p.
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