Errata to “Discriminants in the Grothendieck ring”

IF 4.6 Q2 MATERIALS SCIENCE, BIOMATERIALS

ACS Applied Bio Materials Pub Date : 2020-03-15 DOI:10.1215/00127094-2020-0001

R. Vakil, M. Wood

{"title":"Errata to “Discriminants in the Grothendieck ring”","authors":"R. Vakil, M. Wood","doi":"10.1215/00127094-2020-0001","DOIUrl":null,"url":null,"abstract":"The definition ofM in Section 1.1 should be the quotient of K0(VarK) by relations of the form [X] − [Y ] whenever X → Y is a radicial surjective morphism of varieties over K, and all further statements in the paper should use this corrected definition. This quotient of the Grothendieck ring is often taken for applications to motivic integration (see [Mus11, Section 7.2] and [CNS18, Section 4.4]). When K has characteristic 0, these additional relations were already trivial in K0(VarK) (e.g. see [Mus11, Prop 7.25]). The motivic measure of point counting over a finite field still factors through this new definition ofM. This correction is necessary so that the proofs in the paper, in particular those of Theorem 1.13 and in Section 5, are correct. The arguments claim equality inM of [X] and [Y ] where we have a morphism X → Y that is bijective on points over any algebraically closed field. Such an argument is valid in the corrected definition ofM above ([Mus11, Remark A.22]), but is not known to be valid in K0(VarK). We thank Margaret Bilu and Sean Howe for pointing out this mistake and the necessary correction. See [BH19] for further discussion of this issue.","PeriodicalId":2,"journal":{"name":"ACS Applied Bio Materials","volume":null,"pages":null},"PeriodicalIF":4.6000,"publicationDate":"2020-03-15","publicationTypes":"Journal Article","fieldsOfStudy":null,"isOpenAccess":false,"openAccessPdf":"","citationCount":"2","resultStr":null,"platform":"Semanticscholar","paperid":null,"PeriodicalName":"ACS Applied Bio Materials","FirstCategoryId":"100","ListUrlMain":"https://doi.org/10.1215/00127094-2020-0001","RegionNum":0,"RegionCategory":null,"ArticlePicture":[],"TitleCN":null,"AbstractTextCN":null,"PMCID":null,"EPubDate":"","PubModel":"","JCR":"Q2","JCRName":"MATERIALS SCIENCE, BIOMATERIALS","Score":null,"Total":0}

引用次数: 2

Abstract

The definition ofM in Section 1.1 should be the quotient of K0(VarK) by relations of the form [X] − [Y ] whenever X → Y is a radicial surjective morphism of varieties over K, and all further statements in the paper should use this corrected definition. This quotient of the Grothendieck ring is often taken for applications to motivic integration (see [Mus11, Section 7.2] and [CNS18, Section 4.4]). When K has characteristic 0, these additional relations were already trivial in K0(VarK) (e.g. see [Mus11, Prop 7.25]). The motivic measure of point counting over a finite field still factors through this new definition ofM. This correction is necessary so that the proofs in the paper, in particular those of Theorem 1.13 and in Section 5, are correct. The arguments claim equality inM of [X] and [Y ] where we have a morphism X → Y that is bijective on points over any algebraically closed field. Such an argument is valid in the corrected definition ofM above ([Mus11, Remark A.22]), but is not known to be valid in K0(VarK). We thank Margaret Bilu and Sean Howe for pointing out this mistake and the necessary correction. See [BH19] for further discussion of this issue.

查看原文本刊更多论文

“格罗滕迪克环中的判别式”的勘误表

第1.1节中的M的定义应为K0（VarK）与形式为[X]−[Y]的关系的商，只要X→ Y是K上变种的根满射态射，文中所有进一步的陈述都应该使用这个修正的定义。Grothendieck环的这个商通常用于动积分的应用（见[Mus11，第7.2节]和[CNS18，第4.4节]）。当K具有特征0时，这些附加关系在K0（VarK）中已经是微不足道的（例如，见[Must11，Prop 7.25]）。有限域上点计数的动测度仍然通过这个新的定义M来考虑。这种校正是必要的，这样论文中的证明，特别是定理1.13和第5节中的证明是正确的。论点声称在M中[X]和[Y]相等，其中我们有态射X→ Y在任何代数闭域上的点上是双射的。这样的论点在上面修正的定义Mm（[Mus11，备注A.22]）中是有效的，但在K0（VarK）中是无效的。我们感谢Margaret Bilu和Sean Howe指出了这一错误并进行了必要的纠正。有关此问题的进一步讨论，请参见[BH19]。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

求助全文

约1分钟内获得全文求助全文

来源期刊

ACS Applied Bio Materials Chemistry-Chemistry (all)

CiteScore

9.40

自引率

2.10%

发文量

464