English

Efficient Gr\"obner Bases Computation over Principal Ideal Rings

Commutative Algebra 2019-06-21 v1

Abstract

In this paper we present a new efficient variant to compute strong Gr\"obner basis over quotients of principal ideal domains. We show an easy lifting process which allows us to reduce one computation over the quotient R/nRR/nR to two computations over R/aRR/aR and R/bRR/bR where n=abn = ab with coprime a,ba, b. Possibly using available factorization algorithms we may thus recursively reduce some strong Gr\"obner basis computations to Gr\"obner basis computations over fields for prime factors of nn, at least for squarefree nn. Considering now a computation over R/nRR/nR we can run a standard Gr\"obner basis algorithm pretending R/nRR/nR to be field. If we discover a non-invertible leading coefficient cc, we use this information to try to split n=abn = ab with coprime a,ba, b. If no such cc is discovered, the returned Gr\"obner basis is already a strong Gr\"obner basis for the input ideal over R/nRR/nR.

Keywords

Cite

@article{arxiv.1906.08543,
  title  = {Efficient Gr\"obner Bases Computation over Principal Ideal Rings},
  author = {Christian Eder and Tommy Hofmann},
  journal= {arXiv preprint arXiv:1906.08543},
  year   = {2019}
}
R2 v1 2026-06-23T09:58:51.458Z