Partial Gaussian sums and the P\'olya--Vinogradov inequality for primitive characters

Abstract

In this paper we obtain a new fully explicit constant for the P\'olya-Vinogradov inequality for primitive characters. Given a primitive character modulo q, we prove the following upper bound align* | Σ1 n N (n) | c q q, align* where c=3/(4π2)+oq(1) for even characters and c=3/(8π)+oq(1) for odd characters, with explicit oq(1) terms. This improves a result of Frolenkov and Soundararajan for large q. We proceed, following Hildebrand, obtaining the explicit version of a result by Montgomery--Vaughan on partial Gaussian sums and an explicit Burgess-like result on convoluted Dirichlet characters.