Betti tables of monomial ideals fixed by permutations of the variables

Satoshi Murai

doi:10.1090/tran/8159

Betti tables of monomial ideals fixed by permutations of the variables

Satoshi Murai^*

^*この研究の対応する著者

教育学部

研究成果: Article › 査読

5 被引用数 (Scopus)

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Let S_n be a polynomial ring with n variables over a field and {I_n}_n≥1 a chain of ideals such that each I_n is a monomial ideal of S_n fixed by permutations of the variables. In this paper, we present a way to determine all nonzero positions of Betti tables of I_n for all large intergers n from the Z^mgraded Betti tables of I_m for some small integers m. Our main result shows that the projective dimension and the regularity of I_n eventually become linear functions on n, confirming a special case of conjectures posed by Le, Nagel, Nguyen and Römer.

本文言語	English
ページ（範囲）	7087-7107
ページ数	21
ジャーナル	Transactions of the American Mathematical Society
巻	373
号	10
DOI	https://doi.org/10.1090/tran/8159
出版ステータス	Published - 2020 10月

ASJC Scopus subject areas

数学 (全般)
応用数学

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10.1090/tran/8159

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abstract = "Let Sn be a polynomial ring with n variables over a field and {In}n≥1 a chain of ideals such that each In is a monomial ideal of Sn fixed by permutations of the variables. In this paper, we present a way to determine all nonzero positions of Betti tables of In for all large intergers n from the Zmgraded Betti tables of Im for some small integers m. Our main result shows that the projective dimension and the regularity of In eventually become linear functions on n, confirming a special case of conjectures posed by Le, Nagel, Nguyen and R{\"o}mer.",

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AB - Let Sn be a polynomial ring with n variables over a field and {In}n≥1 a chain of ideals such that each In is a monomial ideal of Sn fixed by permutations of the variables. In this paper, we present a way to determine all nonzero positions of Betti tables of In for all large intergers n from the Zmgraded Betti tables of Im for some small integers m. Our main result shows that the projective dimension and the regularity of In eventually become linear functions on n, confirming a special case of conjectures posed by Le, Nagel, Nguyen and Römer.

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Betti tables of monomial ideals fixed by permutations of the variables

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