Zeros distribution of gaussian entire functions

Abstract

In this paper we consider a random entire function of the form f(z,ω )=Σn=0+∞n(ω )anzn, where n(ω ) are independent standard complex gaussian random variables and an∈C satisfy the relations n+∞[n]|an|=0 and \#\n an≠0\=+∞. We investigate asymptotic properties of the probability P0(r)=P\ω f(z,ω ) has no zeros inside rD\. Denote p0(r)=-P0(r),\ N(r)=\#\n (|an|rn)>0\, s(r)=Σn=0+∞+(|an|rn). Assuming that a0≠0 we prove that 0≤r+∞,\ r E(p0(r)- s(r)) s(r),\ r+∞,\ r E(p0(r)- s(r)) s(r)≤12, r+∞,\ r E(p0(r)- s(r)) N(r)=1. where E is a set of finite logarithmic measure. Remark that the previous inequalities are sharp. Also we give an answer to open question from [p. 119]nishry 5.