An efficient implementation of the algorithm computing the Borel-fixed points of a Hilbert scheme
Symbolic Computation
2012-05-03 v1 Commutative Algebra
Algebraic Geometry
Combinatorics
Abstract
Borel-fixed ideals play a key role in the study of Hilbert schemes. Indeed each component and each intersection of components of a Hilbert scheme contains at least one Borel-fixed point, i.e. a point corresponding to a subscheme defined by a Borel-fixed ideal. Moreover Borel-fixed ideals have good combinatorial properties, which make them very interesting in an algorithmic perspective. In this paper, we propose an implementation of the algorithm computing all the saturated Borel-fixed ideals with number of variables and Hilbert polynomial assigned, introduced from a theoretical point of view in the paper "Segment ideals and Hilbert schemes of points", Discrete Mathematics 311 (2011).
Keywords
Cite
@article{arxiv.1205.0456,
title = {An efficient implementation of the algorithm computing the Borel-fixed points of a Hilbert scheme},
author = {Paolo Lella},
journal= {arXiv preprint arXiv:1205.0456},
year = {2012}
}
Comments
11 pages. Comments are welcome. Accepted for ISSAC 2012