Regularity of prime ideals

被引：9

作者：

Caviglia, Giulio ^{[1
]}

Chardin, Marc ^{[2
,3
]}

McCullough, Jason ^{[4
]}

Peeva, Irena ^{[5
]}

Varbaro, Matteo ^{[6
]}

机构：

[1] Purdue Univ, Dept Math, W Lafayette, IN 47907 USA

[2] CNRS, Inst Math Jussieu, F-75005 Paris, France

[3] Sorbonne Univ, F-75005 Paris, France

[4] Iowa State Univ, Dept Math, 411 Morrill Rd, Ames, IA 50011 USA

[5] Cornell Univ, Dept Math, White Hall, Ithaca, NY 14853 USA

[6] Univ Genoa, Dipartimento Matemat, Via Dodecaneso 35, I-16146 Genoa, Italy

来源：

MATHEMATISCHE ZEITSCHRIFT | 2019年 / 291卷 / 1-2期

关键词：

Syzygies; Free resolutions; Castelnuovo-Mumford Regularity;

D O I：

10.1007/s00209-018-2089-y

中图分类号：

O1 [数学];

学科分类号：

0701 ; 070101 ;

摘要：

We answer several natural questions which arise from a recent paper of McCullough and Peeva providing counterexamples to the Eisenbud-Goto Regularity Conjecture. We give counterexamples using Rees algebras, and also construct counterexamples that do not rely on the Mayr-Meyer construction. Furthermore, examples of prime ideals for which the difference between the maximal degree of a minimal generator and the maximal degree of a minimal first syzygy can be made arbitrarily large are given. Using a result of Ananyan-Hochster we show that there exists an upper bound on regularity of prime ideals in terms of the multiplicity alone.

引用

页码：421 / 435

页数：15

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