Module: Difference between revisions

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imported>Giovanni Antonio DiMatteo
imported>Giovanni Antonio DiMatteo
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==The category of <math>R</math>-modules==
==The category of <math>R</math>-modules==


The morphisms in the category of <math>R</math>-modules are defined respecting the abelian group structure and the action of <math>R</math>.  That is, a morphism <math>\varphi:M\to M'</math> is a homomorphism <math>\varphi</math> of the abelian groups <math>M</math> and <math>M'</math> such that <math>\varphi(r\cdot m)=r\cdot\varphi(m)</math> for all <math>m\in M</math>.


==Examples==
==Examples==

Revision as of 00:22, 18 December 2007

The category of modules over a fixed commutative ring are the prototypical abelian category; this statement is deeper than it may appear, in fact every small abelian category is equivalent to a full subcategory of some category of modules over a ring. This result is due to Freyd and Mitchell.

Definition

Let be a commutative ring with . A (left) -module consists of

  1. An abelian group
  2. an action of on ; i.e., a map , denoted by , such that

The category of -modules

The morphisms in the category of -modules are defined respecting the abelian group structure and the action of . That is, a morphism is a homomorphism of the abelian groups and such that for all .

Examples

  1. The category of -modules is equivalent to the category of abelian groups.