Transcendental sums related to the zeros of zeta functions

Abstract

While the distribution of the non-trivial zeros of the Riemann zeta function constitutes a central theme in Mathematics, nothing is known about the algebraic nature of these non-trivial zeros. In this article, we study the transcendental nature of sums of the form Σ R() x, where the sum is over the non-trivial zeros of ζ(s), R(x) ∈ (x) is a rational function over algebraic numbers and x >0 is a real algebraic number. In particular, we show that the function f(x) = Σ x has infinitely many zeros in (1, ∞), at most one of which is algebraic. The transcendence tools required for studying f(x) in the range x<1 seem to be different from those in the range x>1. For x < 1, we have the following non-vanishing theorem: If for an integer d 1, f(π d x) has a rational zero in (0,~1/π d), then L'(1,-d) ≠ 0, where -d is the quadratic character associated to the imaginary quadratic field K:= (-d). Finally, we consider analogous questions for elements in the Selberg class. Our proofs rest on results from analytic as well as transcendental number theory.