On Artin's conjecture on average and short character sums
Abstract
Let Na(x) denote the number of primes up to x for which the integer a is a primitive root. We show that Na(x) satisfies the asymptotic predicted by Artin's conjecture for almost all 1 a (( x)2). This improves on a result of Stephens (1969). A key ingredient in the proof is a new short character sum estimate over the integers, improving on the range of a result of Garaev (2006).
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