GENERIC LINES IN PROJECTIVE SPACE AND THE KOSZUL PROPERTY

Pub Date : 2022-03-17 DOI:10.1017/nmj.2022.42

J. Rice

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引用次数: 1

Abstract

Abstract In this paper, we study the Koszul property of the homogeneous coordinate ring of a generic collection of lines in $\mathbb {P}^n$ and the homogeneous coordinate ring of a collection of lines in general linear position in $\mathbb {P}^n.$ We show that if $\mathcal {M}$ is a collection of m lines in general linear position in $\mathbb {P}^n$ with $2m \leq n+1$ and R is the coordinate ring of $\mathcal {M},$ then R is Koszul. Furthermore, if $\mathcal {M}$ is a generic collection of m lines in $\mathbb {P}^n$ and R is the coordinate ring of $\mathcal {M}$ with m even and $m +1\leq n$ or m is odd and $m +2\leq n,$ then R is Koszul. Lastly, we show that if $\mathcal {M}$ is a generic collection of m lines such that $$ \begin{align*} m> \frac{1}{72}\left(3(n^2+10n+13)+\sqrt{3(n-1)^3(3n+5)}\right),\end{align*} $$ then R is not Koszul. We give a complete characterization of the Koszul property of the coordinate ring of a generic collection of lines for $n \leq 6$ or $m \leq 6$ . We also determine the Castelnuovo–Mumford regularity of the coordinate ring for a generic collection of lines and the projective dimension of the coordinate ring of collection of lines in general linear position.

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射影空间中的一般直线及koszul性质

摘要在本文中，我们研究了$\mathbb｛P｝^n$中一个一般直线集合的齐次坐标环的Koszul性质和$\mathb｛P〕^n$上一个一般线性位置的直线集合的齐次坐标环我们证明，如果$\mathcal｛M｝$是$\mathbb｛P｝^n$中一般线性位置的M条线的集合，其中$2m\leqn+1$，并且R是$\math cal｛M｝的坐标环，那么R是Koszul。此外，如果$\mathcal｛M｝$是$\mathbb｛P｝^n$中M行的泛型集合，并且R是$\math cal｛M｝$的坐标环，其中M为偶数，$M+1\leqn$或M为奇数，$M+2\leqn，$，则R为Koszul。最后，我们证明了如果$\mathcal｛M｝$是M行的泛型集合，使得$$\boot｛align*｝M>\frac｛1｝｛72｝\left（3（n^2+10n+13）+\sqrt｛3（n-1）^3（3n+5）｝\light），\end｛align*｝$$，则R不是Koszul。我们给出了$n\leq6$或$m\leq6$的一般线集合的坐标环的Koszul性质的一个完整刻画。我们还确定了一般直线集合的坐标环的Castelnuovo–Mumford正则性和一般线性位置的直线集合坐标环的投影维数。

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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