非充填ℓ-adic GKZ 超几何层的特征周期

IF 0.6 3区 数学 Q3 MATHEMATICS
Peijiang Liu
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引用次数: 0

摘要

一个 ℓ-adic GKZ 超几何 Sheaf 的定义类似于一个 GKZ 超几何 D 模块。我们介绍一种计算特定类型的 ℓ-adic GKZ 超几何 sheaf 的特征周期的算法。我们的策略是应用 ℓ-adic Sheaf 的直像的特征周期公式。我们通过计算共切束的某个封闭圆锥子集的直像维度来验证公式成立的要求。我们还定义了一个 ℓ-adic GKZ 型 Sheaf,它的特化张开与一个常量 Sheaf 同构。另一方面,ℓ-adic GKZ 型 Sheaf 的拓扑模型与已计算出其特征周期的非相容 GKZ 超几何 D 模块的 de Rham 函数的图像同构。这提供了一种更简便的方法来确定特定类型的 ℓ-adic 非共轭 GKZ 超几何 sheaf 的特征周期。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
The characteristic cycle of a non-confluent ℓ-adic GKZ hypergeometric sheaf
An -adic GKZ hypergeometric sheaf is defined analogously to a GKZ hypergeometric D-module. We introduce an algorithm of computing the characteristic cycle of an -adic GKZ hypergeometric sheaf of certain type. Our strategy is to apply a formula of the characteristic cycle of the direct image of an -adic sheaf. We verify the requirements for the formula to hold by calculating the dimension of the direct image of a certain closed conical subset of cotangent bundle. We also define an -adic GKZ-type sheaf whose specialization tensored with a constant sheaf is isomorphic to an -adic non-confluent GKZ hypergeometric sheaf. On the other hand, the topological model of an -adic GKZ-type sheaf is isomorphic to the image by the de Rham functor of a non-confluent GKZ hypergeometric D-module whose characteristic cycle has been calculated. This gives an easier way to determine the characteristic cycle of an -adic non-confluent GKZ hypergeometric sheaf of certain type.
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来源期刊
Journal of Number Theory
Journal of Number Theory 数学-数学
CiteScore
1.30
自引率
14.30%
发文量
122
审稿时长
16 weeks
期刊介绍: The Journal of Number Theory (JNT) features selected research articles that represent the broad spectrum of interest in contemporary number theory and allied areas. A valuable resource for mathematicians, the journal provides an international forum for the publication of original research in this field. The Journal of Number Theory is encouraging submissions of quality, long articles where most or all of the technical details are included. The journal now considers and welcomes also papers in Computational Number Theory. Starting in May 2019, JNT will have a new format with 3 sections: JNT Prime targets (possibly very long with complete proofs) high impact papers. Articles published in this section will be granted 1 year promotional open access. JNT General Section is for shorter papers. We particularly encourage submission from junior researchers. Every attempt will be made to expedite the review process for such submissions. Computational JNT . This section aims to provide a forum to disseminate contributions which make significant use of computer calculations to derive novel number theoretic results. There will be an online repository where supplementary codes and data can be stored.
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