Central limit theorems from the roots of probability generating functions

Abstract

For each n, let Xn ∈ \0,…,n\ be a random variable with mean μn, standard deviation σn, and let \[ Pn(z) = Σk=0n P( Xn = k) zk ,\] be its probability generating function. We show that if none of the complex zeros of the polynomials \ Pn(z)\ are contained in a neighbourhood of 1 ∈ C and σn > n for some >0, then Xn* =(Xn - μn)σ-1n tends to a normal random variable Z N(0,1) in distribution as n → ∞. Moreover, we show this result is sharp in the sense that there exist sequences of random variables \Xn\ with σn > C n for which Pn(z) has no roots near 1 and Xn* is not asymptotically normal. These results disprove a conjecture of Pemantle and improve upon various results in the literature. We go on to prove several other results connecting the location of the zeros of Pn(z) and the distribution of the random variables Xn.