Comprehensive Systems for Primary Decompositions of Parametric Ideals

arXiv - MATH - Commutative Algebra Pub Date : 2024-08-28 DOI:arxiv-2408.15917

Yuki Ishihara, Kazuhiro Yokoyama

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Abstract

We present an effective method for computing parametric primary decomposition via comprehensive Gr\"obner systems. In general, it is very difficult to compute a parametric primary decomposition of a given ideal in the polynomial ring with rational coefficients $\mathbb{Q}[A,X]$ where $A$ is the set of parameters and $X$ is the set of ordinary variables. One cause of the difficulty is related to the irreducibility of the specialized polynomial. Thus, we introduce a new notion of ``feasibility'' on the stability of the structure of the ideal in terms of its primary decomposition, and we give a new algorithm for computing a so-called comprehensive system consisting of pairs $(C, \mathcal{Q})$, where for each parameter value in $C$, the ideal has the stable decomposition $\mathcal{Q}$. We may call this comprehensive system a parametric primary decomposition of the ideal. Also, one can also compute a dense set $\mathcal{O}$ such that $\varphi_\alpha(\mathcal{Q})$ is a primary decomposition for any $\alpha\in C\cap \mathcal{O}$ via irreducible polynomials. In addition, we give several computational examples to examine the effectiveness of our new decomposition.

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参数理想的一级分解综合系统

我们提出了一种通过综合 Gr\"obner 系统计算参数一级分解的有效方法。一般来说，在有理系数为 $\mathbb{Q}[A,X]$（其中 $A$ 是参数集，$X$ 是普通变量集）的多项式环中计算给定理想的参数一级分解是非常困难的。因此，我们引入了一个新的 "可行性 "概念，即理想的一级分解结构的稳定性，并给出了一个新的算法来计算由$(C, \mathcal{Q})$组成的所谓综合系统，其中对于$C$中的每个参数值，理想都有稳定的分解$\mathcal{Q}$。我们可以称这个综合系统为理想的参数一级分解。同时，我们也可以通过不可还原多项式计算出一个密集 $/mathcal{O}$，使得 $\varphi_\alpha(\mathcal{Q})$ 是 C\cap \mathcal{O}$ 中任意 $\alpha 的一级分解。此外，我们给出了几个计算实例来检验我们新分解的有效性。

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arXiv - MATH - Commutative Algebra

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