On the constant in Burgess' bound for the number of consecutive residues or non-residues
Abstract
We give an explicit version of a result due to D. Burgess. Let be a non-principal Dirichlet character modulo a prime p. We show that the maximum number of consecutive integers for which takes on a particular value is less than \π e63+o(1)\p1/4 p, where the o(1) term is given explicitly.
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