Flips and variation of moduli scheme of sheaves on a surface

Kimiko Yamada
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引用次数: 6

Abstract

Let $H$ be an ample line bundle on a non-singular projective surface $X$, and $M(H)$ the coarse moduli scheme of rank-two $H$-semistable sheaves with fixed Chern classes on $X$. We show that if $H$ changes and passes through walls to get closer to $K_X$, then $M(H)$ undergoes natural flips with respect to canonical divisors. When $X$ is minimal and its Kodaira dimension is positive, this sequence of flips terminates in $M(H_X)$; $H_X$ is an ample line bundle lying so closely to $K_X$ that the canonical divisor of $M(H_X)$ is nef. Remark that so-called Thaddeus-type flips somewhat differ from flips with respect to canonical divisors.
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表面上轮轴模格式的翻转和变化
设$H$为非奇异投影曲面$X$上的一个充足的线束,$M(H)$为$X$上的两个$H$-具有固定Chern类的半稳定轴的粗模格式。我们证明了如果$H$改变并穿过墙壁接近$K_X$,则$M(H)$相对正则因子发生自然翻转。当$X$是最小的并且它的Kodaira维数是正的,这个翻转序列终止于$M(H_X)$;$H_X$是一个非常接近$K_X$的行束,因此$M(H_X)$的规范除数是nef。注意,所谓的thaddeus型翻转在正则除数方面与翻转有些不同。
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期刊介绍: Papers on pure and applied mathematics intended for publication in the Kyoto Journal of Mathematics should be written in English, French, or German. Submission of a paper acknowledges that the paper is original and is not submitted elsewhere.
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