Ideal sheaf

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11SCHEMES Contents 1. Introduction 2. Locally ringed spaces 3. Open immersions of locally ringed spaces

SCHEMES Contents 1. Introduction 2. Locally ringed spaces 3. Open immersions of locally ringed spaces

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Source URL: stacks.math.columbia.edu

Language: English - Date: 2015-04-15 15:08:50
12Contemporary Mathematics Gluing Schemes and a Scheme Without Closed Points Karl Schwede Communicated by S´

Contemporary Mathematics Gluing Schemes and a Scheme Without Closed Points Karl Schwede Communicated by S´

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Source URL: www-personal.umich.edu

Language: English - Date: 2008-01-10 14:00:51
13Characterizing Ideal Weighted Threshold Secret Sharing Amos Beimel1 , Tamir Tassa1,2 , and Enav Weinreb1 1 2

Characterizing Ideal Weighted Threshold Secret Sharing Amos Beimel1 , Tamir Tassa1,2 , and Enav Weinreb1 1 2

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Source URL: www.iacr.org

Language: English - Date: 2008-09-15 00:54:53
14Available online at www.sciencedirect.com Advances in Mathematics[removed]–1672 www.elsevier.com/locate/aim K -theory of log-schemes II: Log-syntomic K -theoryI

Available online at www.sciencedirect.com Advances in Mathematics[removed]–1672 www.elsevier.com/locate/aim K -theory of log-schemes II: Log-syntomic K -theoryI

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Source URL: www.math.utah.edu

Language: English - Date: 2012-06-06 09:18:20
15ON THE ISOMORPHISM BETWEEN THE DUALIZING SHEAF AND THE CANONICAL SHEAF ´ MATTHEW H. BAKER AND JANOS A. CSIRIK Abstract. We give a new proof of the isomorphism between the dualizing

ON THE ISOMORPHISM BETWEEN THE DUALIZING SHEAF AND THE CANONICAL SHEAF ´ MATTHEW H. BAKER AND JANOS A. CSIRIK Abstract. We give a new proof of the isomorphism between the dualizing

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Source URL: www.csirik.net

Language: English - Date: 2014-01-19 15:08:47
16NON-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
17SCISSORS CONGRUENCE GROUPS AND THE THIRD HOMOLOGY OF SL2 OF LOCAL RINGS AND FIELDS

SCISSORS CONGRUENCE GROUPS AND THE THIRD HOMOLOGY OF SL2 OF LOCAL RINGS AND FIELDS

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Source URL: arxiv-web3.library.cornell.edu

Language: English - Date: 2013-09-19 20:35:19
18Spectral Schemes as Ringed Lattices Thierry Coquand∗, Henri Lombardi†, and Peter Schuster‡ October 7, 2009

Spectral Schemes as Ringed Lattices Thierry Coquand∗, Henri Lombardi†, and Peter Schuster‡ October 7, 2009

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Source URL: hlombardi.free.fr

Language: English - Date: 2009-10-07 14:45:38
19

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Source URL: math.stanford.edu

Language: English - Date: 2009-08-25 16:05:18