Limit theorems for random Dirichlet series

Abstract

We prove a functional limit theorem in a space of analytic functions for the random Dirichlet series D(α;z)=Σn≥ 2( n)α(ηn+ i θn)/nz, properly scaled and normalized, where (ηn,θn)n∈N is a sequence of independent copies of a centered R2-valued random vector (η,θ) with a finite second moment and α>-1/2 is a fixed real parameter. As a consequence, we show that the point processes of complex and real zeros of D(α;z) converge vaguely, thereby obtaining a universality result. In the real case, that is, when P\θ=0\=1, we also prove a law of the iterated logarithm for D(α;z), properly normalized, as z (1/2)+.