An effective universality theorem for the Riemann zeta-function

Abstract

Let 0<r<1/4, and f be a non-vanishing continuous function in |z|≤ r, that is analytic in the interior. Voronin's universality theorem asserts that translates of the Riemann zeta function ζ(3/4 + z + it) can approximate f uniformly in |z| < r to any given precision , and moreover that the set of such t ∈ [0, T] has measure at least c() T for some c() > 0, once T is large enough. This was refined by Bagchi who showed that the measure of such t ∈ [0,T] is (c() + o(1)) T, for all but at most countably many > 0. Using a completely different approach, we obtain the first effective version of Voronin's Theorem, by showing that in the rate of convergence one can save a small power of the logarithm of T. Our method is flexible, and can be generalized to other L-functions in the t-aspect, as well as to families of L-functions in the conductor aspect.