Difference between revisions of "Modules, category of"
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| − | <table><TR><TD valign="top">[1]</TD> <TD valign="top"> | + | <table><TR><TD valign="top">[1]</TD> <TD valign="top"> H. Bass, "Algebraic <img align="absmiddle" border="0" src="https://www.encyclopediaofmath.org/legacyimages/m/m064/m064480/m06448036.png" />-theory" , Benjamin (1968) {{MR|249491}} {{ZBL|}} </TD></TR><TR><TD valign="top">[2]</TD> <TD valign="top"> I. Bucur, A. Deleanu, "Introduction to the theory of categories and functors" , Wiley (1968) {{MR|0236236}} {{ZBL|0197.29205}} </TD></TR><TR><TD valign="top">[3]</TD> <TD valign="top"> C. Faith, "Algebra: rings, modules and categories" , '''1–2''' , Springer (1973–1976) {{MR|0551052}} {{MR|0491784}} {{MR|0366960}} {{ZBL|0508.16001}} {{ZBL|0266.16001}} </TD></TR></table> |
Revision as of 17:34, 31 March 2012
The category mod-
whose objects are the right unitary modules over an arbitrary associative ring 
with identity, and whose morphisms are the homomorphisms of 
-modules. This category is the most important example of an Abelian category. Moreover, for every small Abelian category there is a full exact imbedding into some category of modules.
If 
, the ring of integers, then mod-
is the category of Abelian groups, and if 
is a skew-field, then mod-
is the category of vector spaces over 
.
The properties of mod-
reflect a number of important properties of the ring 
(see Homological classification of rings). Connected with this category is a number of important homological invariants of the ring; in particular, its homological dimension. The centre of mod-
(that is, the set of natural transformations of the identity functor of the category) is isomorphic to the centre of 
.
In ring theory, homological algebra and algebraic 
-theory, various subcategories of the category of modules are discussed; in particular, the subcategory of finitely-generated projective 
-modules and the associated 
-functors (see Algebraic 
-theory). By analogy with Pontryagin duality, dualities between full subcategories of the category of modules have been studied; in particular between subcategories of finitely-generated modules. For example, it has been established that if 
and 
are Noetherian rings and if there is duality between finitely-generated right 
-modules and finitely-generated left 
-modules, then there is a bimodule 
such that the given duality is equivalent to the duality defined by the functors
 |
the ring of endomorphisms 
is isomorphic to 
, 
is isomorphic to 
, the bimodule 
is a finitely-generated injective cogenerator (both as an 
-module and an 
-module), and the ring 
is semi-perfect (cf. Semi-perfect ring). The most important class of rings, arising in the consideration of duality of modules, is the class of quasi-Frobenius rings (cf. Quasi-Frobenius ring). A left Artinian ring 
is quasi-Frobenius if and only if the mapping
 |
defines a duality between the categories of finitely-generated left and right 
-modules.
References
| [1] | H. Bass, "Algebraic  -theory" , Benjamin (1968) MR249491 |
| [2] | I. Bucur, A. Deleanu, "Introduction to the theory of categories and functors" , Wiley (1968) MR0236236 Zbl 0197.29205 |
| [3] | C. Faith, "Algebra: rings, modules and categories" , 1–2 , Springer (1973–1976) MR0551052 MR0491784 MR0366960 Zbl 0508.16001 Zbl 0266.16001 |
Comments
A duality given by a bimodule 
as described above is called a 
-duality or Morita duality; cf. also (the comments to) Morita equivalence.
Modules, category of. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Modules,_category_of&oldid=17739