Étale topology

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51Invent. math. 127, 375 – [removed]On the image of p-adic regulators Wieslawa Niziol The University of Chicago, Department of Mathematics, 5734 University Avenue, Chicago, IL 60637, USA (e-mail: [removed]cago.

Invent. math. 127, 375 – [removed]On the image of p-adic regulators Wieslawa Niziol The University of Chicago, Department of Mathematics, 5734 University Avenue, Chicago, IL 60637, USA (e-mail: [removed]cago.

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Source URL: www.math.utah.edu

Language: English - Date: 2006-09-18 20:50:10
52MOTIVIC DECOMPOSITION OF CERTAIN SPECIAL LINEAR GROUPS ALEXANDER S. MERKURJEV Abstract. We compute the motive of the algebraic group G = SL1 (D) for a central simple algebra D of prime degree over a perfect field. As an

MOTIVIC DECOMPOSITION OF CERTAIN SPECIAL LINEAR GROUPS ALEXANDER S. MERKURJEV Abstract. We compute the motive of the algebraic group G = SL1 (D) for a central simple algebra D of prime degree over a perfect field. As an

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Source URL: www.math.uni-bielefeld.de

Language: English - Date: 2014-03-10 15:01:52
53GALOIS SECTIONS FOR ABELIANIZED FUNDAMENTAL GROUPS arXiv:0808.2556v2 [math.AG] 9 Apr 2009 ´ SZAMUELY

GALOIS SECTIONS FOR ABELIANIZED FUNDAMENTAL GROUPS arXiv:0808.2556v2 [math.AG] 9 Apr 2009 ´ SZAMUELY

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Source URL: people.maths.ox.ac.uk

Language: English - Date: 2012-04-13 17:27:34
54[Page 1] On Dwork cohomology for singular hypersurfaces Francesco Baldassarri and Pierre Berthelot

[Page 1] On Dwork cohomology for singular hypersurfaces Francesco Baldassarri and Pierre Berthelot

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Source URL: perso.univ-rennes1.fr

Language: English - Date: 2006-04-28 04:27:45
55NAGATA COMPACTIFICATION FOR ALGEBRAIC SPACES BRIAN CONRAD, MAX LIEBLICH, AND MARTIN OLSSON Abstract. We prove the Nagata compactification theorem for any separated map of finite type between quasi-compact and quasi-separ

NAGATA COMPACTIFICATION FOR ALGEBRAIC SPACES BRIAN CONRAD, MAX LIEBLICH, AND MARTIN OLSSON Abstract. We prove the Nagata compactification theorem for any separated map of finite type between quasi-compact and quasi-separ

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Source URL: math.stanford.edu

Language: English - Date: 2010-06-23 22:43:39
56The Comparison Isomorphisms Ccris Fabrizio Andreatta July 9, 2009 Contents 1 Introduction

The Comparison Isomorphisms Ccris Fabrizio Andreatta July 9, 2009 Contents 1 Introduction

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Source URL: math.stanford.edu

Language: English - Date: 2009-07-09 01:59:57
57UNIVERSAL PROPERTY OF NON-ARCHIMEDEAN ANALYTIFICATION BRIAN CONRAD 1. Introduction 1.1. Motivation. Over C and over non-archimedean fields, analytification of algebraic spaces is defined as the solution to a quotient pro

UNIVERSAL PROPERTY OF NON-ARCHIMEDEAN ANALYTIFICATION BRIAN CONRAD 1. Introduction 1.1. Motivation. Over C and over non-archimedean fields, analytification of algebraic spaces is defined as the solution to a quotient pro

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Source URL: math.stanford.edu

Language: English - Date: 2010-08-24 01:02:52
58NON-ARCHIMEDEAN ANALYTIFICATION OF ALGEBRAIC SPACES BRIAN CONRAD AND MICHAEL TEMKIN 1. Introduction 1.1. Motivation. This paper is largely concerned with constructing quotients by ´etale equivalence relations. We are in

NON-ARCHIMEDEAN ANALYTIFICATION OF ALGEBRAIC SPACES BRIAN CONRAD AND MICHAEL TEMKIN 1. Introduction 1.1. Motivation. This paper is largely concerned with constructing quotients by ´etale equivalence relations. We are in

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Source URL: math.stanford.edu

Language: English - Date: 2009-02-24 12:45:41
59Workshop on group schemes and p-divisible groups: Homework[removed]i) Using the structure theorem and Frobenius morphisms, prove that a finite group scheme over a field is killed by its order. (Exer. 3(ii) in HW1 gives a

Workshop on group schemes and p-divisible groups: Homework[removed]i) Using the structure theorem and Frobenius morphisms, prove that a finite group scheme over a field is killed by its order. (Exer. 3(ii) in HW1 gives a

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Source URL: math.stanford.edu

Language: English - Date: 2005-05-26 17:44:58
60INTRODUCTION Algebraic K-theory has two components: the classical theory which centers around the Grothendieck group K0 of a category and uses explicit algebraic presentations, and higher algebraic K-theory which requir

INTRODUCTION Algebraic K-theory has two components: the classical theory which centers around the Grothendieck group K0 of a category and uses explicit algebraic presentations, and higher algebraic K-theory which requir

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Source URL: www.math.rutgers.edu

Language: English - Date: 2013-10-25 00:52:27