The Du Bois complex of a hypersurface and the minimal exponent

IF 2.3 1区 数学 Q1 MATHEMATICS Duke Mathematical Journal Pub Date : 2021-05-04 DOI:10.1215/00127094-2022-0074
M. Mustaţă, S. Olano, M. Popa, J. Witaszek
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引用次数: 19

Abstract

We study the Du Bois complex $\underline{\Omega}_Z^\bullet$ of a hypersurface $Z$ in a smooth complex algebraic variety in terms its minimal exponent $\widetilde{\alpha}(Z)$. The latter is an invariant of singularities, defined as the negative of the greatest root of the reduced Bernstein-Sato polynomial of $Z$, and refining the log canonical threshold. We show that if $\widetilde{\alpha}(Z)\geq p+1$, then the canonical morphism $\Omega_Z^p\to \underline{\Omega}_Z^p$ is an isomorphism, where $\underline{\Omega}_Z^p$ is the $p$-th associated graded piece of the Du Bois complex with respect to the Hodge filtration. On the other hand, if $Z$ is singular and $\widetilde{\alpha}(Z)>p\geq 2$, we obtain non-vanishing results for some of the higher cohomologies of $\underline{\Omega}_Z^{n-p}$.
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超曲面的Du-Bois复形与极小指数
我们研究了光滑复代数变体中超曲面$Z$的Du-Bois复形$\underline{\Omega}_Z^\bullet$,其最小指数为$\widetilde{\alpha}(Z)$。后者是奇点的不变量,定义为$Z$的简化Bernstein Sato多项式的最大根的负值,并改进了对数正则阈值。我们证明了如果$\widetilde{\alpha}(Z)\geqp+1$,则正则态射$\Omega_Z^p\to\underline{\Omega}_Z^p$是同构,其中$\underline{\Omega}_Z^p:是关于Hodge滤的Du Bois复形的第$p$个相关的分次片。另一方面,如果$Z$是奇异的并且$\widetilde{\alpha}(Z)>p\geq2$,我们得到了$\underline{\Omega}_Z^{n-p}$的一些较高上同调的非消失结果。
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来源期刊
CiteScore
3.40
自引率
0.00%
发文量
61
审稿时长
6-12 weeks
期刊介绍: Information not localized
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