复杂链接和希尔伯特-塞缪尔多重性

IF 1.6 2区数学 Q2 MATHEMATICS, APPLIED

SIAM Journal on Applied Algebra and Geometry Pub Date : 2020-06-18 DOI:10.1137/22m1475533

M. Helmer, Vidit Nanda

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引用次数: 0

摘要

我们描述了一个从有限点样本中估计射影变量$X \子集$ Y$对的Hilbert-Samuel多重性$e_XY$的框架，而不是定义方程。第一步是证明这种多重性在某些超平面截面下保持不变，这些超平面截面将X$简化为点$p$，将Y$简化为曲线$C$。接下来，我们建立了$e_pC$等于$C$中$p$的复链接的欧拉特征(因此是基数)。最后，我们提供了所需的一致点样本数量的显式界限(在$p$在$C$的环形邻域内)，以高置信度确定该欧拉特征。

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Complex Links and Hilbert-Samuel Multiplicities

We describe a framework for estimating Hilbert-Samuel multiplicities $e_XY$ for pairs of projective varieties $X \subset Y$ from finite point samples rather than defining equations. The first step involves proving that this multiplicity remains invariant under certain hyperplane sections which reduce $X$ to a point $p$ and $Y$ to a curve $C$. Next, we establish that $e_pC$ equals the Euler characteristic (and hence, the cardinality) of the complex link of $p$ in $C$. Finally, we provide explicit bounds on the number of uniform point samples needed (in an annular neighborhood of $p$ in $C$) to determine this Euler characteristic with high confidence.

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来源期刊

SIAM Journal on Applied Algebra and Geometry MATHEMATICS, APPLIED-

CiteScore

2.20

自引率

0.00%

发文量