On the Milnor and Tjurina Numbers of Zero-Dimensional Singularities

IF 0.6 4区 数学 Q3 MATHEMATICS
A. G. Aleksandrov
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引用次数: 1

Abstract

In this paper we study relationships between some topological and analytic invariants of zero-dimensional germs, or multiple points. Among other things, it is shown that there exist no rigid zero-dimensional Gorenstein singularities and rigid almost complete intersections. In the proof of the first result we exploit the canonical duality between homology and cohomology of the cotangent complex, while in the proof of the second we use a new method which is based on the properties of the torsion functor. In addition, we obtain highly efficient estimates for the dimension of the spaces of the first lower and upper cotangent functors of arbitrary zero-dimensional singularities, including the space of derivations. We also consider examples of nonsmoothable zero-dimensional noncomplete intersections and discuss some properties and methods for constructing such singularities using the theory of modular deformations, as well as a number of other applications.

关于零维奇点的Milnor数和Tjurina数
本文研究了零维细菌或多点的一些拓扑不变量和解析不变量之间的关系。此外,还证明了不存在刚性零维Gorenstein奇点和刚性几乎完全交叉点。在证明第一个结果时,我们利用了余切复的同调和上同调之间的正则对偶性,而在证明第二个结果时,我们使用了一种基于扭转函子性质的新方法。此外,我们得到了任意零维奇点的第一个上下协切函子的空间维数的高效估计,包括导数的空间。我们还考虑了非光滑零维非完全交点的例子,并讨论了利用模变形理论构造这种奇点的一些性质和方法,以及一些其他应用。
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
CiteScore
0.90
自引率
0.00%
发文量
7
审稿时长
>12 weeks
期刊介绍: Functional Analysis and Its Applications publishes current problems of functional analysis, including representation theory, theory of abstract and functional spaces, theory of operators, spectral theory, theory of operator equations, and the theory of normed rings. The journal also covers the most important applications of functional analysis in mathematics, mechanics, and theoretical physics.
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