English

New practical advances in polynomial root clustering

Symbolic Computation 2019-11-18 v1 Numerical Analysis Numerical Analysis

Abstract

We report an ongoing work on clustering algorithms for complex roots of a univariate polynomial pp of degree dd with real or complex coefficients. As in their previous best subdivision algorithms our root-finders are robust even for multiple roots of a polynomial given by a black box for the approximation of its coefficients, and their complexity decreases at least proportionally to the number of roots in a region of interest (ROI) on the complex plane, such as a disc or a square, but we greatly strengthen the main ingredient of the previous algorithms. Namely our new counting test essentially amounts to the evaluation of a polynomial pp and its derivative pp', which is a major benefit, e.g., for sparse polynomials pp. Moreover with evaluation at about log(d)\log(d) points (versus the previous record of order dd) we output correct number of roots in a disc whose contour has no roots of pp nearby. Moreover we greatly soften the latter requirement versus the known subdivision algorithms. Our second and less significant contribution concerns subdivision algorithms for polynomials with real coefficients. Our tests demonstrate the power of the proposed algorithms.

Keywords

Cite

@article{arxiv.1911.06706,
  title  = {New practical advances in polynomial root clustering},
  author = {Rémi Imbach and Victor Y. Pan},
  journal= {arXiv preprint arXiv:1911.06706},
  year   = {2019}
}

Comments

Version submitted and accepted to MACIS 2019

R2 v1 2026-06-23T12:17:15.949Z