Asymptotic Results for Random Polynomials on the Unit Circle

Abstract

In this paper we study the asymptotic behavior of the maximum magnitude of a complex random polynomial with i.i.d. uniformly distributed random roots on the unit circle. More specifically, let \nk\k=1∞ be an infinite sequence of positive integers and let \zk\k=1∞ be a sequence of i.i.d. uniform distributed random variables on the unit circle. The above pair of sequences determine a sequence of random polynomials PN(z) = Πk=1N(z-zk)nk with random roots on the unit circle and their corresponding multiplicities. In this work, we show that subject to a certain regularity condition on the sequence \nk\k=1∞, the log maximum magnitude of these polynomials scales as sNI* where sN2=Σk=1Nnk2 and I* is a strictly positive random variable.