{"title":"正加权同质除数的扭曲对数复数","authors":"Daniel Bath, M. Saito","doi":"10.1090/jag/833","DOIUrl":null,"url":null,"abstract":"For a rank 1 local system on the complement of a reduced divisor on a complex manifold \n\n \n X\n X\n \n\n, its cohomology is calculated by the twisted meromorphic de Rham complex. Assuming the divisor is everywhere positively weighted homogeneous, we study necessary or sufficient conditions for a quasi-isomorphism from its twisted logarithmic subcomplex, called the logarithmic comparison theorem (LCT), by using a stronger version in terms of the associated complex of \n\n \n \n D\n X\n \n D_X\n \n\n-modules. In case the connection is a pullback by a defining function \n\n \n f\n f\n \n\n of the divisor and the residue is \n\n \n α\n \\alpha\n \n\n, we prove among others that if LCT holds, the annihilator of \n\n \n \n f\n \n α\n −\n 1\n \n \n f^{\\alpha -1}\n \n\n in \n\n \n \n D\n X\n \n D_X\n \n\n is generated by first order differential operators and \n\n \n \n α\n −\n 1\n −\n j\n \n \\alpha -1-j\n \n\n is not a root of the Bernstein-Sato polynomial for any positive integer \n\n \n j\n j\n \n\n. The converse holds assuming either of the two conditions in case the associated complex of \n\n \n \n D\n X\n \n D_X\n \n\n-modules is acyclic except for the top degree. In the case where the local system is constant, the divisor is defined by a homogeneous polynomial, and the associated projective hypersurface has only weighted homogeneous isolated singularities, we show that LCT is equivalent to that \n\n \n \n −\n 1\n \n -1\n \n\n is the unique integral root of the Bernstein-Sato polynomial. We also give a simple proof of LCT in the hyperplane arrangement case under appropriate assumptions on residues, which is an immediate corollary of higher cohomology vanishing associated with Castelnuovo-Mumford regularity. Here the zero-extension case is also treated.","PeriodicalId":54887,"journal":{"name":"Journal of Algebraic Geometry","volume":null,"pages":null},"PeriodicalIF":0.9000,"publicationDate":"2024-07-12","publicationTypes":"Journal Article","fieldsOfStudy":null,"isOpenAccess":false,"openAccessPdf":"","citationCount":"3","resultStr":"{\"title\":\"Twisted logarithmic complexes of positively weighted homogeneous divisors\",\"authors\":\"Daniel Bath, M. Saito\",\"doi\":\"10.1090/jag/833\",\"DOIUrl\":null,\"url\":null,\"abstract\":\"For a rank 1 local system on the complement of a reduced divisor on a complex manifold \\n\\n \\n X\\n X\\n \\n\\n, its cohomology is calculated by the twisted meromorphic de Rham complex. Assuming the divisor is everywhere positively weighted homogeneous, we study necessary or sufficient conditions for a quasi-isomorphism from its twisted logarithmic subcomplex, called the logarithmic comparison theorem (LCT), by using a stronger version in terms of the associated complex of \\n\\n \\n \\n D\\n X\\n \\n D_X\\n \\n\\n-modules. In case the connection is a pullback by a defining function \\n\\n \\n f\\n f\\n \\n\\n of the divisor and the residue is \\n\\n \\n α\\n \\\\alpha\\n \\n\\n, we prove among others that if LCT holds, the annihilator of \\n\\n \\n \\n f\\n \\n α\\n −\\n 1\\n \\n \\n f^{\\\\alpha -1}\\n \\n\\n in \\n\\n \\n \\n D\\n X\\n \\n D_X\\n \\n\\n is generated by first order differential operators and \\n\\n \\n \\n α\\n −\\n 1\\n −\\n j\\n \\n \\\\alpha -1-j\\n \\n\\n is not a root of the Bernstein-Sato polynomial for any positive integer \\n\\n \\n j\\n j\\n \\n\\n. The converse holds assuming either of the two conditions in case the associated complex of \\n\\n \\n \\n D\\n X\\n \\n D_X\\n \\n\\n-modules is acyclic except for the top degree. In the case where the local system is constant, the divisor is defined by a homogeneous polynomial, and the associated projective hypersurface has only weighted homogeneous isolated singularities, we show that LCT is equivalent to that \\n\\n \\n \\n −\\n 1\\n \\n -1\\n \\n\\n is the unique integral root of the Bernstein-Sato polynomial. We also give a simple proof of LCT in the hyperplane arrangement case under appropriate assumptions on residues, which is an immediate corollary of higher cohomology vanishing associated with Castelnuovo-Mumford regularity. 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引用次数: 3
摘要
对于复流形 X X 上还原除数的补集上的 1 级局部系统,其同调是通过扭曲对数 de Rham 复数计算的。假设除数处处都是正向加权同调,我们研究了从其扭曲对数子复数(称为对数比较定理(LCT))出发的准同调的必要或充分条件,并使用了与 D X D_X 模块相关复数的更强版本。如果连接是除数的定义函数 f f 的回拉,并且残差是 α \alpha ,我们证明了如果 LCT 成立,那么在 D X D_X 中 f α - 1 f^{alpha -1} 的湮没器由一阶微分算子生成,并且 α - 1 - j \alpha -1-j 对于任何正整数 j j 都不是伯恩斯坦-萨托多项式的根。反过来,假设这两个条件中的任何一个,D X D_X 模块的相关复数除了顶层之外都是非循环的,那么反过来也成立。在局部系统恒定、除数由同次多项式定义、相关投影超曲面只有加权同次孤立奇点的情况下,我们证明 LCT 等价于 - 1 -1 是伯恩斯坦-萨托多项式的唯一积分根。我们还给出了超平面排列情况下 LCT 的简单证明,该证明是与卡斯特努沃-蒙福德正则性相关的高同调消失的直接推论。这里还处理了零扩展情况。
Twisted logarithmic complexes of positively weighted homogeneous divisors
For a rank 1 local system on the complement of a reduced divisor on a complex manifold
X
X
, its cohomology is calculated by the twisted meromorphic de Rham complex. Assuming the divisor is everywhere positively weighted homogeneous, we study necessary or sufficient conditions for a quasi-isomorphism from its twisted logarithmic subcomplex, called the logarithmic comparison theorem (LCT), by using a stronger version in terms of the associated complex of
D
X
D_X
-modules. In case the connection is a pullback by a defining function
f
f
of the divisor and the residue is
α
\alpha
, we prove among others that if LCT holds, the annihilator of
f
α
−
1
f^{\alpha -1}
in
D
X
D_X
is generated by first order differential operators and
α
−
1
−
j
\alpha -1-j
is not a root of the Bernstein-Sato polynomial for any positive integer
j
j
. The converse holds assuming either of the two conditions in case the associated complex of
D
X
D_X
-modules is acyclic except for the top degree. In the case where the local system is constant, the divisor is defined by a homogeneous polynomial, and the associated projective hypersurface has only weighted homogeneous isolated singularities, we show that LCT is equivalent to that
−
1
-1
is the unique integral root of the Bernstein-Sato polynomial. We also give a simple proof of LCT in the hyperplane arrangement case under appropriate assumptions on residues, which is an immediate corollary of higher cohomology vanishing associated with Castelnuovo-Mumford regularity. Here the zero-extension case is also treated.
期刊介绍:
The Journal of Algebraic Geometry is devoted to research articles in algebraic geometry, singularity theory, and related subjects such as number theory, commutative algebra, projective geometry, complex geometry, and geometric topology.
This journal, published quarterly with articles electronically published individually before appearing in an issue, is distributed by the American Mathematical Society (AMS). In order to take advantage of some features offered for this journal, users will occasionally be linked to pages on the AMS website.