Universality and distribution of zeros and poles of some zeta functions

Abstract

This paper studies zeta functions of the form Σn=1∞ (n) n-s, with a completely multiplicative function taking only unimodular values. We denote by σ() the infimum of those α such that the Dirichlet series Σn=1∞ (n) n-s can be continued meromorphically to the half-plane Re s>α, and denote by ζ(s) the corresponding meromorphic function in Re s>σ(). We construct ζ(s) that have σ() 1/2 and are universal for zero-free analytic functions on the half-critical strip 1/2<Re s <1, with zeros and poles at any discrete multisets lying in a strip to the right of Re s =1/2 and satisfying a density condition that is somewhat stricter than the density hypothesis for the zeros of the Riemann zeta function. On a conceivable version of Cram\'er's conjecture for gaps between primes, the density condition can be relaxed, and zeros and poles can also be placed at β+i γ with β 1-λ |γ|/ |γ| when λ>1. Finally, we show that there exists ζ(s) with σ() 1/2 and zeros at any discrete multiset in the strip 1/2<Re s 39/40 with no accumulation point in Re s >1/2; on the Riemann hypothesis, this strip may be replaced by the half-critical strip 1/2 < Re s < 1.