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Simplicial Resolutions of Powers of Square-free Monomial Ideals

Authors :
Cooper, Susan M.
Khoury, Sabine El
Faridi, Sara
Mayes-Tang, Sarah
Morey, Susan
Sega, Liana M.
Spiroff, Sandra
Source :
Algebraic Combinatorics, Volume 7 (2024) no. 1, pp. 77-107
Publication Year :
2022

Abstract

The Taylor resolution is almost never minimal for powers of monomial ideals, even in the square-free case. In this paper we introduce a smaller resolution for each power of any square-free monomial ideal, which depends only on the number of generators of the ideal. More precisely, for every pair of fixed integers $r$ and $q$, we construct a simplicial complex that supports a free resolution of the $r$-th power of any square-free monomial ideal with $q$ generators. The resulting resolution is significantly smaller than the Taylor resolution, and is minimal for special cases. Considering the relations on the generators of a fixed ideal allows us to further shrink these resolutions. We also introduce a class of ideals called "extremal ideals", and show that the Betti numbers of powers of all square-free monomial ideals are bounded by Betti numbers of powers of extremal ideals. Our results lead to upper bounds on Betti numbers of powers of any square-free monomial ideal that greatly improve the binomial bounds offered by the Taylor resolution.<br />Comment: 32 pages, 3 figures, 1 table

Details

Database :
arXiv
Journal :
Algebraic Combinatorics, Volume 7 (2024) no. 1, pp. 77-107
Publication Type :
Report
Accession number :
edsarx.2204.03136
Document Type :
Working Paper