Roots of random polynomials whose coefficients have logarithmic tails

Abstract

It has been shown by Ibragimov and Zaporozhets [In Prokhorov and Contemporary Probability Theory (2013) Springer] that the complex roots of a random polynomial Gn(z)=Σk=0nkzk with i.i.d. coefficients 0,…,n concentrate a.s. near the unit circle as n∞ if and only if E+|0|<∞. We study the transition from concentration to deconcentration of roots by considering coefficients with tails behaving like L(|t|)(|t|)-α as t∞, where α≥0, and L is a slowly varying function. Under this assumption, the structure of complex and real roots of Gn is described in terms of the least concave majorant of the Poisson point process on [0,1]× (0,∞) with intensity α v-(α+1)\,du\,dv.