Flat ring epimorphisms and universal localizations of commutative rings

IF 0.6 4区 数学 Q3 MATHEMATICS Quarterly Journal of Mathematics Pub Date : 2020-03-01 DOI:10.1093/qmath/haaa041
Lidia Angeleri Hügel;Frederik Marks;Jan Št’ovíček;Ryo Takahashi;Jorge Vitória
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引用次数: 15

Abstract

We study different types of localizations of a commutative noetherian ring. More precisely, we provide criteria to decide: (a) if a given flat ring epimorphism is a universal localization in the sense of Cohn and Schofield; and (b) when such universal localizations are classical rings of fractions. In order to find such criteria, we use the theory of support and we analyse the specialization closed subset associated to a flat ring epimorphism. In case the underlying ring is locally factorial or of Krull dimension one, we show that all flat ring epimorphisms are universal localizations. Moreover, it turns out that an answer to the question of when universal localizations are classical depends on the structure of the Picard group. We furthermore discuss the case of normal rings, for which the divisor class group plays an essential role to decide if a given flat ring epimorphism is a universal localization. Finally, we explore several (counter)examples which highlight the necessity of our assumptions.
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交换环的平环附子与泛定域
我们研究了交换诺瑟环的不同类型的局部化。更准确地说,我们提供了判定标准:(a)如果给定的平环同态是Cohn和Schofield意义上的普遍局部化;以及(b)当这样的普遍局部化是分数的经典环时。为了找到这样的标准,我们使用支持理论,并分析了与平环泛同态相关的专门化闭子集。在下面的环是局部阶乘或Krull维数为1的情况下,我们证明了所有的平环差向同构都是泛局部化。此外,普遍局部化何时是经典的问题的答案取决于Picard群的结构。我们进一步讨论了正规环的情况,对于正规环,除数子群在决定给定的平环同态是否是泛局部化中起着重要作用。最后,我们探讨了几个(反)例子,这些例子强调了我们假设的必要性。
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来源期刊
CiteScore
1.30
自引率
0.00%
发文量
36
审稿时长
6-12 weeks
期刊介绍: The Quarterly Journal of Mathematics publishes original contributions to pure mathematics. All major areas of pure mathematics are represented on the editorial board.
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