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Title: On the regularity and defect sequence of monomial and binomial ideals (English)
Author: Borna, Keivan
Author: Mohajer, Abolfazl
Language: English
Journal: Czechoslovak Mathematical Journal
ISSN: 0011-4642 (print)
ISSN: 1572-9141 (online)
Volume: 69
Issue: 3
Year: 2019
Pages: 653-664
Summary lang: English
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Category: math
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Summary: When $S$ is a polynomial ring or more generally a standard graded algebra over a field $K$, with homogeneous maximal ideal $\mathfrak {m}$, it is known that for an ideal $I$ of $S$, the regularity of powers of $I$ becomes eventually a linear function, i.e., ${\rm reg}(I^m)=dm+e$ for $m\gg 0$ and some integers $d$, $ e$. This motivates writing ${\rm reg}(I^m)=dm+e_m$ for every $m\geq 0$. The sequence $e_m$, called the \emph {defect sequence} of the ideal $I$, is the subject of much research and its nature is still widely unexplored. We know that $e_m$ is eventually constant. In this article, after proving various results about the regularity of monomial ideals and their powers, we give several bounds and restrictions on $e_m$ and its first differences when $I$ is a primary monomial ideal. Our theorems extend the previous results about $\mathfrak {m}$-primary ideals in the monomial case. We also use our results to obtatin information about the regularity of powers of a monomial ideal using its primary decomposition. Finally, we study another interesting phenomenon related to the defect sequence, namely that of regularity jump, where we give an infinite family of ideals with regularity jumps at the second power. (English)
Keyword: Castelnuovo-Mumford regularity
Keyword: powers of ideal
Keyword: defect sequence
MSC: 13D02
MSC: 13P10
idZBL: Zbl 07088810
idMR: MR3989272
DOI: 10.21136/CMJ.2018.0458-17
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Date available: 2019-07-24T11:16:01Z
Last updated: 2021-10-04
Stable URL: http://hdl.handle.net/10338.dmlcz/147783
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Reference: [7] Hà, H. T., Trung, N. V., Trung, T. N.: Depth and regularity of powers of sums of ideals.Math. Z. 282 (2016), 819-838. Zbl 1345.13006, MR 3473645, 10.1007/s00209-015-1566-9
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