Sign changes of Kloosterman sums and exceptional characters
Abstract
We prove that the existence of exceptional real zeroes of Dirichlet L-functions would lead to cancellations in the sum Σp≤ x (1, p) of Kloosterman sums over primes, and also to sign changes of (1, n), where n runs over integers with exactly two prime factors. Our arguments involve a variant of Bombieri's sieve, bounds for twisted sums of Kloosterman sums, and work of Fouvry and Michel on sums of | (1, n)|.
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