Module homomorphism

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11Algebraic Persistence the algebra of persistence modules Mikael Vejdemo-Johansson Primoz Skraba School of Computer Science

Algebraic Persistence the algebra of persistence modules Mikael Vejdemo-Johansson Primoz Skraba School of Computer Science

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Source URL: www.icms.org.uk

Language: English - Date: 2012-07-11 07:17:02
12UNRAMIFIED DEGREE THREE INVARIANTS OF REDUCTIVE GROUPS A. MERKURJEV Abstract. We prove that if G is a reductive group over an algebraically closed field F , then for a prime integer p 6= char(F ), the group of unramified

UNRAMIFIED DEGREE THREE INVARIANTS OF REDUCTIVE GROUPS A. MERKURJEV Abstract. We prove that if G is a reductive group over an algebraically closed field F , then for a prime integer p 6= char(F ), the group of unramified

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

Language: English - Date: 2014-11-24 17:55:06
13NOTES ON CHAIN COMPLEXES ANDREW BAKER These notes are intended as a very basic introduction to (co)chain complexes and their algebra, the intention being to point the beginner at some of the main ideas which should be fu

NOTES ON CHAIN COMPLEXES ANDREW BAKER These notes are intended as a very basic introduction to (co)chain complexes and their algebra, the intention being to point the beginner at some of the main ideas which should be fu

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Source URL: www.maths.gla.ac.uk

Language: English - Date: 2009-04-06 06:57:56
14Chapter 5 Linear Algebra The exalted position held by linear algebra is based upon the subject’s ubiquitous utility and ease of application. The basic theory is developed here in full generality, i.e., modules are defi

Chapter 5 Linear Algebra The exalted position held by linear algebra is based upon the subject’s ubiquitous utility and ease of application. The basic theory is developed here in full generality, i.e., modules are defi

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Source URL: www.math.miami.edu

Language: English - Date: 2004-03-18 17:56:56
15Chapter 2 Groups Groups are the central objects of algebra. In later chapters we will define rings and modules and see that they are special cases of groups. Also ring homomorphisms and module homomorphisms are special c

Chapter 2 Groups Groups are the central objects of algebra. In later chapters we will define rings and modules and see that they are special cases of groups. Also ring homomorphisms and module homomorphisms are special c

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Source URL: www.math.miami.edu

Language: English - Date: 2004-03-18 17:56:53
1610. Homomorphism modules and tensor products We recall that in Section 8 we defined the notion of a free module. Given a set S, the free R-module, F (S) = R(S) , is

10. Homomorphism modules and tensor products We recall that in Section 8 we defined the notion of a free module. Given a set S, the free R-module, F (S) = R(S) , is

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Source URL: www.math.leidenuniv.nl

Language: English - Date: 2003-09-25 13:05:12
17

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Source URL: www.math.ntu.edu.tw

Language: English - Date: 2010-10-02 23:42:55
18

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Source URL: www.cms.zju.edu.cn

Language: English - Date: 2005-07-30 02:57:26