Differentiably simple rings and ring extensions defined by p-basis

Pub Date : 2024-05-28 DOI:10.1016/j.jpaa.2024.107735
Celia del Buey de Andrés , Diego Sulca , Orlando E. Villamayor
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Abstract

We review the concept of differentiably simple ring and we give a new proof of Harper's Theorem on the characterization of Noetherian differentiably simple rings in positive characteristic. We then study flat families of differentiably simple rings, or equivalently, finite flat extensions of rings which locally admit p-basis. These extensions are called Galois extensions of exponent one. For such an extension AC, we introduce an A-scheme, called the Yuan scheme, which parametrizes subextensions ABC such that BC is Galois of a fixed rank. So, roughly, the Yuan scheme can be thought of as a kind of Grassmannian of Galois subextensions. We finally prove that the Yuan scheme is smooth and compute the dimension of the fibers.

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由 p 基定义的微分简环和环扩展
我们回顾了微分简环的概念,并给出了关于正特征诺特微分简环特征的哈珀定理的新证明。然后,我们研究微分简环的平面族,或者等价于局部承认-基础的环的有限平面扩展。这些扩展称为 。对于这样的扩展,我们引入了一个-方案,称为元方案,它参数化了子扩展,使得它是固定秩的伽罗瓦。因此,袁方案大致可以看作是伽罗瓦子扩展的一种格拉斯曼。最后,我们将证明元方案是光滑的,并计算纤维的维度。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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