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L'algèbre de Hopf et le groupe de Galois motiviques d'un corps de caractéristique nulle, II


Ayoub, Joseph (2014). L'algèbre de Hopf et le groupe de Galois motiviques d'un corps de caractéristique nulle, II. Journal für die Reine und Angewandte Mathematik, 2014(693):151-226.

Abstract

This is the second article of a series of two, aiming at constructing and studying motivic Galois groups in the context of triangulated motives. These motivic Galois groups were constructed in the first article and their algebras of regular functions were described concretely in terms of differential forms or algebraic cycles. In the present article, we gather important complements to the first one. In the first part of this article, we describe the link between the motivic Galois group and the usual Galois group of a subfield of ℂ. In the second part, we develop the basis of a theory of ramification for the motivic Galois groups by constructing motivic versions of the decomposition and inertia groups associated to a geometric valuation. We also introduce the relative motivic Galois group of an extension K/k which measures the difference between the motivic Galois groups of k and K. The latter is more accessible than its absolute counterpart. In effect, we show that it is a quotient of the pro-algebraic completion of the topological fundamental pro-group of a the pro-variety homk(K, ℂ), at least when the extension K/k is of finite type.

This is the second article of a series of two, aiming at constructing and studying motivic Galois groups in the context of triangulated motives. These motivic Galois groups were constructed in the first article and their algebras of regular functions were described concretely in terms of differential forms or algebraic cycles. In the present article, we gather important complements to the first one. In the first part of this article, we describe the link between the motivic Galois group and the usual Galois group of a subfield of ℂ. In the second part, we develop the basis of a theory of ramification for the motivic Galois groups by constructing motivic versions of the decomposition and inertia groups associated to a geometric valuation. We also introduce the relative motivic Galois group of an extension K/k which measures the difference between the motivic Galois groups of k and K. The latter is more accessible than its absolute counterpart. In effect, we show that it is a quotient of the pro-algebraic completion of the topological fundamental pro-group of a the pro-variety homk(K, ℂ), at least when the extension K/k is of finite type.

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5 citations in Web of Science®
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Additional indexing

Item Type:Journal Article, refereed, original work
Communities & Collections:07 Faculty of Science > Institute of Mathematics
Dewey Decimal Classification:510 Mathematics
Language:English
Date:August 2014
Deposited On:27 Jan 2015 16:06
Last Modified:05 Apr 2016 18:45
Publisher:De Gruyter
ISSN:0075-4102
Publisher DOI:https://doi.org/10.1515/crelle-2012-0090
Permanent URL: https://doi.org/10.5167/uzh-104063

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