Stable Border Bases for Ideals of Points

John Abbott; Claudia Fassino; Maria-Laura Torrente

Stable Border Bases for Ideals of Points

Commutative Algebra 2009-03-18 v2 Numerical Analysis

Authors: John Abbott , Claudia Fassino , Maria-Laura Torrente

Journal reference: Journal of Symbolic Computation, 43, 2008, 883--894

Comments: This is an update version of "Notes on stable Border Bases" and it is submitted to JSC. 16 pages, 0 figures

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Abstract

Let $X$ be a set of points whose coordinates are known with limited accuracy; our aim is to give a characterization of the vanishing ideal $I(X)$ independent of the data uncertainty. We present a method to compute a polynomial basis $B$ of $I(X)$ which exhibits structural stability, that is, if $\widetilde X$ is any set of points differing only slightly from $X$ , there exists a polynomial set $\widetilde B$ structurally similar to $B$ , which is a basis of the perturbed ideal $I(\widetilde X)$ .

Keywords

stability theory stability analysis monomial ideals

Cite

@article{arxiv.0706.2316,
  title  = {Stable Border Bases for Ideals of Points},
  author = {John Abbott and Claudia Fassino and Maria-Laura Torrente},
  journal= {arXiv preprint arXiv:0706.2316},
  year   = {2009}
}

Stable Border Bases for Ideals of Points

Abstract

Keywords

Cite

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