形式格式的Drinfeld-Grinberg-Kazhdan定理与奇点理论

Q4 Mathematics

Confluentes Mathematici Pub Date : 2017-09-13 DOI:10.5802/CML.35

David Bourqui, J. Sebag

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引用次数: 16

摘要

设k为一个场。在本文中，我们在形式几何的背景下提供了德林菲尔德-格林伯格-卡扎丹定理的扩展版本。证明了对于Spf(k[[T]])上的每一个拓扑有限型形式方案V，对于每一个非奇异弧γ∈L∞(V)(k)，存在一个仿射诺etherian形式k-方案S和一个形式k-方案L∞(V)γ ~ = S ×k Spf(k[[(Ti)i∈N]])的同构。我们强调证明是建设性的，并且当V是仿射代数k变的补全时，证明是有效可实现的。此外，我们还从奇点理论的角度推导了这种同构的一些性质。

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The Drinfeld-Grinberg-Kazhdan Theorem for formal schemes and singularity theory

Let k be a field. In this article, we provide an extended version of the Drinfeld-Grinberg-Kazhdan Theorem in the context of formal geometry. We prove that, for every formal scheme V topologically of finite type over Spf(k[[T ]]), for every non-singular arc γ ∈ L∞(V )(k), there exists an affine noetherian adic formal k-scheme S and an isomorphism of formal k-schemes L∞(V )γ ∼= S ×k Spf(k[[(Ti)i∈N]]). We emphasize the fact that the proof is constructive and, when V is the completion of an affine algebraic k-variety, effectively implementable. Besides, we derive some properties of such an isomorphism in the direction of singularity theory.

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来源期刊

Confluentes Mathematici Mathematics-Mathematics (miscellaneous)

CiteScore

0.60

自引率

0.00%

发文量

期刊介绍： Confluentes Mathematici is a mathematical research journal. Since its creation in 2009 by the Institut Camille Jordan UMR 5208 and the Unité de Mathématiques Pures et Appliquées UMR 5669 of the Université de Lyon, it reflects the wish of the mathematical community of Lyon—Saint-Étienne to participate in the new forms of scientific edittion. The journal is electronic only, fully open acces and without author charges. The journal aims to publish high quality mathematical research articles in English, French or German. All domains of Mathematics (pure and applied) and Mathematical Physics will be considered, as well as the History of Mathematics. Confluentes Mathematici also publishes survey articles. Authors are asked to pay particular attention to the expository style of their article, in order to be understood by all the communities concerned.