Unconditional estimates on the argument of Dirichlet L-functions with applications to low-lying zeros

Abstract

We make explicit a result of Selberg on the argument of Dirichlet L-functions averaged over non-principal characters modulo a prime q. As a corollary, we show for all sufficiently large prime q that the height of the lowest non-trivial zero of the corresponding family of L-functions is less than 1075· 2π q. Here the scaling factor 2π q is the average spacing between consecutive low-lying zeros with height at most 1, say. We also obtain a lower bound on the proportion of L-functions whose first zero lies within a given multiple of the average spacing. These appear to be the first explicit unconditional results of their kinds.

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