Toric splittings

Anargyros Katsabekis; Apostolos Thoma

arXiv:2410.18467·math.AC·October 25, 2024

Toric splittings

Anargyros Katsabekis, Apostolos Thoma

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TL;DR

This paper characterizes when a toric ideal can be decomposed into simpler toric ideals, providing a clear criterion and applying it to various classes to determine their splittability.

Contribution

It offers a necessary and sufficient condition for toric ideal splittability based on the matrix A, advancing understanding of their algebraic structure.

Findings

01

Established a criterion for toric ideal splittability.

02

Applied the criterion to classify classes of toric ideals.

03

Identified classes that are or are not splittable.

Abstract

The toric ideal $I_{A}$ is splittable if it has a toric splitting; namely, if there exist toric ideals $I_{A_{1}}, I_{A_{2}}$ such that $I_{A} = I_{A_{1}} + I_{A_{2}}$ and $I_{A_{i}} \neq = I_{A}$ for all $1 \leq i \leq 2$ . We provide a necessary and sufficient condition for a toric ideal to be splittable in terms of $A$ , and we apply it to prove or disprove that certain classes of toric ideals are splittable.

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Taxonomy

TopicsMetallurgy and Material Science