Large character sums: Burgess's theorem and zeros of L-functions
Abstract
We study the conjecture that Σn≤ x (n)=o(x) for any primitive Dirichlet character q with x≥ qε, which is known to be true if the Riemann Hypothesis holds for L(s,). We show that it holds under the weaker assumption that `100\%' of the zeros of L(s,) up to height 14 lie on the critical line; and establish various other consequences of having large character sums.
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