Embedding codimension of the space of arcs

IF 4.6 Q2 MATERIALS SCIENCE, BIOMATERIALS
C. Chiu, Tommaso de Fernex, Roi Docampo
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引用次数: 7

Abstract

Abstract We introduce a notion of embedding codimension of an arbitrary local ring, establish some general properties and study in detail the case of arc spaces of schemes of finite type over a field. Viewing the embedding codimension as a measure of singularities, our main result can be interpreted as saying that the singularities of the arc space are maximal at the arcs that are fully embedded in the singular locus of the underlying scheme, and progressively improve as we move away from said locus. As an application, we complement a theorem of Drinfeld, Grinberg and Kazhdan on formal neighbourhoods in arc spaces by providing a converse to their theorem, an optimal bound for the embedding codimension of the formal model appearing in the statement, a precise formula for the embedding dimension of the model constructed in Drinfeld’s proof and a geometric meaningful way of realising the decomposition stated in the theorem.
弧空间的嵌入余维
摘要我们引入了任意局部环的嵌入余维数的概念,建立了一些一般性质,并详细研究了域上有限型格式的弧空间的情况。将嵌入余维视为奇点的度量,我们的主要结果可以解释为,弧空间的奇点在完全嵌入底层方案的奇异轨迹的弧处是最大的,并且随着我们远离所述轨迹而逐渐改进。作为一个应用,我们补充了Drinfeld、Grinberg和Kazhdan关于弧空间中形式邻域的一个定理,通过提供它们的定理的逆定理,即出现在语句中的形式模型的嵌入余维数的最优界,Drinfeld证明中建立的模型嵌入维数的精确公式,以及实现定理中所述分解的几何意义的方法。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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来源期刊
ACS Applied Bio Materials
ACS Applied Bio Materials Chemistry-Chemistry (all)
CiteScore
9.40
自引率
2.10%
发文量
464
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