Random polynomials: the closest roots to the unit circle
Probability
2020-10-22 v1 Classical Analysis and ODEs
Combinatorics
Abstract
Let be a random polynomial, where are iid standard Gaussian random variables, and let denote the roots of . We show that the point process determined by the magnitude of the roots tends to a Poisson point process at the scale as . One consequence of this result is that it determines the magnitude of the closest root to the unit circle. In particular, we show that in distribution, where denotes an exponential random variable of mean . This resolves a conjecture of Shepp and Vanderbei from 1995 that was later studied by Konyagin and Schlag.
Cite
@article{arxiv.2010.10869,
title = {Random polynomials: the closest roots to the unit circle},
author = {Marcus Michelen and Julian Sahasrabudhe},
journal= {arXiv preprint arXiv:2010.10869},
year = {2020}
}