Fast real and complex root-finding methods for well-conditioned polynomials
Abstract
Given a polynomial of degree and a bound on a condition number of , we present the first root-finding algorithms that return all its real and complex roots with a number of bit operations quasi-linear in . More precisely, several condition numbers can be defined depending on the norm chosen on the coefficients of the polynomial. Let . We call the condition number associated with a perturbation of the the hyperbolic condition number , and the one associated with a perturbation of the the elliptic condition number . For each of these condition numbers, we present algorithms that find the real and the complex roots of in bit operations.Our algorithms are well suited for random polynomials since (resp. ) is bounded by a polynomial in with high probability if the (resp. the ) are independent, centered Gaussian variables of variance .
Cite
@article{arxiv.2102.04180,
title = {Fast real and complex root-finding methods for well-conditioned polynomials},
author = {Guillaume Moroz},
journal= {arXiv preprint arXiv:2102.04180},
year = {2021}
}