提升曲线的基本阿贝尔盖

Pub Date : 2024-09-26 DOI:10.1016/j.jalgebra.2024.09.007
Jianing Yang
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引用次数: 0

摘要

给定特性 p 域上曲线 f 的伽罗瓦盖,提升问题问是否存在一个完整混合特性离散估值环上的伽罗瓦盖,其还原为 f。我们证明了一个提升基本无常 p 盖的组合准则,它取决于其 p 循环子盖的提升支点位置。我们还研究了提升的分支点如何在特殊纤维上凝聚。最后,对于 p=2,我们分析了不同导体类型的 (Z/2)3 覆盖的几个族的提升,既有等距支点几何,也有非等距支点几何。
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Lifting elementary Abelian covers of curves
Given a Galois cover of curves f over a field of characteristic p, the lifting problem asks whether there exists a Galois cover over a complete mixed characteristic discrete valuation ring whose reduction is f. In this paper, we consider the case where the Galois groups are elementary abelian p-groups. We prove a combinatorial criterion for lifting an elementary abelian p-cover, dependent on the branch loci of lifts of its p-cyclic subcovers. We also study how branch points of a lift coalesce on the special fiber. Finally, for p=2, we analyze lifts for several families of (Z/2)3-covers of various conductor types, both with equidistant branch locus geometry and non-equidistant branch locus geometry.
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