The Bottleneck Degree of Algebraic Varieties

IF 1.6 2区 数学 Q2 MATHEMATICS, APPLIED SIAM Journal on Applied Algebra and Geometry Pub Date : 2019-04-09 DOI:10.1137/19m1265776
S. Rocco, David Eklund, Madeleine Weinstein
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引用次数: 20

Abstract

A bottleneck of a smooth algebraic variety $X \subset \mathbb{C}^n$ is a pair of distinct points $(x,y) \in X$ such that the Euclidean normal spaces at $x$ and $y$ contain the line spanned by $x$ and $y$. The narrowness of bottlenecks is a fundamental complexity measure in the algebraic geometry of data. In this paper we study the number of bottlenecks of affine and projective varieties, which we call the bottleneck degree. The bottleneck degree is a measure of the complexity of computing all bottlenecks of an algebraic variety, using for example numerical homotopy methods. We show that the bottleneck degree is a function of classical invariants such as Chern classes and polar classes. We give the formula explicitly in low dimension and provide an algorithm to compute it in the general case.
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代数变种的瓶颈度
平滑代数变量$X \子集$ mathbb{C}^n$的瓶颈是X$中的一对不同的点$(X,y) \,使得$X $和$y$处的欧几里德正规空间包含由$X $和$y$张成的直线。瓶颈的窄性是数据代数几何中一个基本的复杂性度量。本文研究了仿射和射影变量的瓶颈数,我们称之为瓶颈度。瓶颈度是计算一个代数变量的所有瓶颈的复杂性的度量,例如使用数值同伦方法。我们证明瓶颈度是经典不变量如Chern类和极坐标类的函数。给出了低维的显式公式,并给出了一般情况下的计算算法。
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
CiteScore
2.20
自引率
0.00%
发文量
19
期刊最新文献
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