English

$p$-adic algorithm for bivariate Gr\"obner bases

Commutative Algebra 2023-12-22 v1 Symbolic Computation

Abstract

We present a pp-adic algorithm to recover the lexicographic Gr\"obner basis G\mathcal G of an ideal in Q[x,y]\mathbb Q[x,y] with a generating set in Z[x,y]\mathbb Z[x,y], with a complexity that is less than cubic in terms of the dimension of Q[x,y]/G\mathbb Q[x,y]/\langle \mathcal G \rangle and softly linear in the height of its coefficients. We observe that previous results of Lazard's that use Hermite normal forms to compute Gr\"obner bases for ideals with two generators can be generalized to a set of tN+t\in \mathbb N^+ generators. We use this result to obtain a bound on the height of the coefficients of G\mathcal G, and to control the probability of choosing a \textit{good} prime pp to build the pp-adic expansion of G\mathcal G.

Keywords

Cite

@article{arxiv.2312.14116,
  title  = {$p$-adic algorithm for bivariate Gr\"obner bases},
  author = {Eric Schost and Catherine St-Pierre},
  journal= {arXiv preprint arXiv:2312.14116},
  year   = {2023}
}

Comments

(ACM) Proceeding in International Symposium on Symbolic and Algebraic Computation 2023 (ISSAC 2023), July 24--27, 2023, Troms{\o}, Norway

R2 v1 2026-06-28T13:59:03.724Z