混合特征情况下的共切线束和微支撑

Takeshi Saito
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引用次数: 2

摘要

对于正则格式及其简化闭子格式,后者是正特征的完美域上的有限型,我们将其限制于闭子格式的余切束定义为域上的光滑格式上的向量束族,该光滑格式通过Frobenius因子分解具有闭子格式的态射。对于方案的起始点上的一个可构造复合体,我们引入了在共切束上的一个闭锥子集上微支撑的条件。我们计算了秩为1的若干Kummer轴的奇异支撑力。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Cotangent bundles and micro-supports in mixed characteristic case
For a regular scheme and its reduced closed subscheme, the latter being of finite type over a perfect field of positive characteristic, we define its cotangent bundle restricted to the closed subscheme as a family of vector bundles on smooth schemes over the field endowed with morphisms to the closed subscheme factoring through the Frobenius. For a constructible complex on the etale site of the scheme, we introduce the condition to be micro-supported on a closed conical subset in the cotangent bundle. We compute the singular supports of certain Kummer sheaves of rank 1.
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