English

On Isolating Roots in a Multiple Field Extension

Symbolic Computation 2023-06-08 v1

Abstract

We address univariate root isolation when the polynomial's coefficients are in a multiple field extension. We consider a polynomial FL[Y]F \in L[Y], where LL is a multiple algebraic extension of Q\mathbb{Q}. We provide aggregate bounds for FF and algorithmic and bit-complexity results for the problem of isolating its roots. For the latter problem we follow a common approach based on univariate root isolation algorithms. For the particular case where FF does not have multiple roots, we achieve a bit-complexity in O~B(nd2n+2(d+nτ))\tilde{\mathcal{O}}_B(n d^{2n+2}(d+n\tau)), where dd is the total degree and τ\tau is the bitsize of the involved polynomials.In the general case we need to enhance our algorithm with a preprocessing step that determines the number of distinct roots of FF. We follow a numerical, yet certified, approach that has bit-complexity O~B(n2d3n+3τ+n3d2n+4τ)\tilde{\mathcal{O}}_B(n^2d^{3n+3}\tau + n^3 d^{2n+4}\tau).

Keywords

Cite

@article{arxiv.2306.04271,
  title  = {On Isolating Roots in a Multiple Field Extension},
  author = {Christina Katsamaki and Fabrice Rouillier},
  journal= {arXiv preprint arXiv:2306.04271},
  year   = {2023}
}
R2 v1 2026-06-28T10:58:36.640Z