English

A Factorization Algorithm for G-Algebras and Applications

Rings and Algebras 2017-12-06 v1 Symbolic Computation Operator Algebras

Abstract

It has been recently discovered by Bell, Heinle and Levandovskyy that a large class of algebras, including the ubiquitous GG-algebras, are finite factorization domains (FFD for short). Utilizing this result, we contribute an algorithm to find all distinct factorizations of a given element fGf \in \mathcal{G}, where G\mathcal{G} is any GG-algebra, with minor assumptions on the underlying field. Moreover, the property of being an FFD, in combination with the factorization algorithm, enables us to propose an analogous description of the factorized Gr\"obner basis algorithm for GG-algebras. This algorithm is useful for various applications, e.g. in analysis of solution spaces of systems of linear partial functional equations with polynomial coefficients, coming from G\mathcal{G}. Additionally, it is possible to include inequality constraints for ideals in the input.

Keywords

Cite

@article{arxiv.1602.00296,
  title  = {A Factorization Algorithm for G-Algebras and Applications},
  author = {Albert Heinle and Viktor Levandovskyy},
  journal= {arXiv preprint arXiv:1602.00296},
  year   = {2017}
}
R2 v1 2026-06-22T12:40:22.850Z