English

Random polynomials: the closest roots to the unit circle

Probability 2020-10-22 v1 Classical Analysis and ODEs Combinatorics

Abstract

Let f=k=0nεkzkf = \sum_{k=0}^n \varepsilon_k z^k be a random polynomial, where ε0,,εn\varepsilon_0,\ldots ,\varepsilon_n are iid standard Gaussian random variables, and let ζ1,,ζn\zeta_1,\ldots,\zeta_n denote the roots of ff. We show that the point process determined by the magnitude of the roots {1ζ1,,1ζn}\{ 1-|\zeta_1|,\ldots, 1-|\zeta_n| \} tends to a Poisson point process at the scale n2n^{-2} as nn\rightarrow \infty. One consequence of this result is that it determines the magnitude of the closest root to the unit circle. In particular, we show that minkζk1n2Exp(1/6), \min_{k} ||\zeta_k| - 1|n^2 \rightarrow \mathrm{Exp}(1/6), in distribution, where Exp(λ)\mathrm{Exp}(\lambda) denotes an exponential random variable of mean λ1\lambda^{-1}. This resolves a conjecture of Shepp and Vanderbei from 1995 that was later studied by Konyagin and Schlag.

Keywords

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}
}
R2 v1 2026-06-23T19:30:58.480Z