Burch ideals and Burch rings

Hailong Dao; Toshinori Kobayashi; Ryo Takahashi

doi:10.2140/ant.2020.14.2121

Abstract

We introduce the notion of Burch ideals and Burch rings. They are easy to define, and can be viewed as generalization of many well-known concepts, for example integrally closed ideals of finite colength and Cohen–Macaulay rings of minimal multiplicity. We give several characterizations of these objects. We show that they satisfy many interesting and desirable properties: ideal-theoretic, homological, categorical. We relate them to other classes of ideals and rings in the literature.

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Hailong Dao. Toshinori Kobayashi. Ryo Takahashi. "Burch ideals and Burch rings." Algebra Number Theory 14 (8) 2121 - 2150, 2020. https://doi.org/10.2140/ant.2020.14.2121

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Received: 12 June 2019; Revised: 23 November 2019; Accepted: 5 March 2020; Published: 2020

First available in Project Euclid: 12 November 2020

MathSciNet: MR4172703

Digital Object Identifier: 10.2140/ant.2020.14.2121

Subjects:

Primary: 13C13

Secondary: 13D09 , 13H10

Keywords: (weakly) m-full ideal , Burch ideal , Burch ring , direct summand , fiber product , Gorenstein ring , Hypersurface , singular locus , singularity category , syzygy , thick subcategory

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