Generalized splittings of monomial ideals

Tricia Brown; Rachelle Bouchat

doi:10.24330/ieja.1488479

Generalized splittings of monomial ideals

Tricia Brown
, Rachelle Bouchat

Mathematical Sciences

Research output: Contribution to journal › Article › peer-review

Abstract

Eliahou and Kervaire defined splittable monomial ideals and provided a relationship between the Betti numbers of the more complicated ideal in terms of the less complicated pieces. We extend the concept of splittable monomial ideals showing that an ideal which was not splittable according to the original definition is splittable in this more general definition. Further, we provide a generalized version of the result concerning the relationship between the Betti numbers.

Original language	American English
Pages (from-to)	112-124
Number of pages	13
Journal	International Electronic Journal of Algebra
Volume	37
Issue number	37
DOIs	https://doi.org/10.24330/ieja.1488479
State	Published - Jan 14 2025

Scopus Subject Areas

Algebra and Number Theory

Keywords

Betti number
splitting

Access to Document

10.24330/ieja.1488479License: Unspecified

Cite this

@article{6830e1ff36ac49339d65e9997e96acdd,

title = "Generalized splittings of monomial ideals",

abstract = "Eliahou and Kervaire defined splittable monomial ideals and provided a relationship between the Betti numbers of the more complicated ideal in terms of the less complicated pieces. We extend the concept of splittable monomial ideals showing that an ideal which was not splittable according to the original definition is splittable in this more general definition. Further, we provide a generalized version of the result concerning the relationship between the Betti numbers.",

keywords = "Betti number, splitting",

author = "Tricia Brown and Rachelle Bouchat",

year = "2025",

month = jan,

day = "14",

doi = "10.24330/ieja.1488479",

language = "American English",

volume = "37",

pages = "112--124",

journal = "International Electronic Journal of Algebra",

issn = "1306-6048",

publisher = "Hacettepe University",

number = "37",

}

TY - JOUR

T1 - Generalized splittings of monomial ideals

AU - Brown, Tricia

AU - Bouchat, Rachelle

PY - 2025/1/14

Y1 - 2025/1/14

N2 - Eliahou and Kervaire defined splittable monomial ideals and provided a relationship between the Betti numbers of the more complicated ideal in terms of the less complicated pieces. We extend the concept of splittable monomial ideals showing that an ideal which was not splittable according to the original definition is splittable in this more general definition. Further, we provide a generalized version of the result concerning the relationship between the Betti numbers.

AB - Eliahou and Kervaire defined splittable monomial ideals and provided a relationship between the Betti numbers of the more complicated ideal in terms of the less complicated pieces. We extend the concept of splittable monomial ideals showing that an ideal which was not splittable according to the original definition is splittable in this more general definition. Further, we provide a generalized version of the result concerning the relationship between the Betti numbers.

KW - Betti number

KW - splitting

UR - https://www.scopus.com/pages/publications/85216306569

U2 - 10.24330/ieja.1488479

DO - 10.24330/ieja.1488479

M3 - Article

SN - 1306-6048

VL - 37

SP - 112

EP - 124

JO - International Electronic Journal of Algebra

JF - International Electronic Journal of Algebra

IS - 37

ER -

Generalized splittings of monomial ideals

Abstract

Scopus Subject Areas

Keywords

Access to Document

Other files and links

Fingerprint

Cite this