Bentolhoda Binaei, Amir Hashemi, Werner M. Seiler
Published 2018-09-28Version 1
We investigate the application of syzygies for efficiently computing (finite) Pommaret bases. For this purpose, we first describe a non-trivial variant of Gerdt's algorithm to construct an involutive basis for the input ideal as well as an involutive basis for the syzygy module of the output basis. Then we apply this new algorithm in the context of Seiler's method to transform a given ideal into quasi stable position to ensure the existence of a finite Pommaret basis. This new approach allows us to avoid superfluous reductions in the iterative computation of Janet bases required by this method. We conclude the paper by proposing an involutive variant of the signature based algorithm of Gao et al. to compute simultaneously a Grobner basis for a given ideal and for the syzygy module of the input basis. All the presented algorithms have been implemented in Maple and their performance is evaluated via a set of benchmark ideals.
Comments: Computer Algebra in Scientific Computing (CASC 2018), Lille, France, 2018
Journal: Lecture Notes in Computer Science, Volume 11077, pages 51--66, 2018
Computation of Milnor numbers and critical values at infinity
About the computation of the signature of surface singularities z^N+g(x,y)=0
Algorithm for computing $μ$-bases of univariate polynomials
![QR code for arXiv:1809.10971 [math.AG]](http://oss.arxitics.com/images/favicon.svg)