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Difference between revisions of "Classical semi-simple ring"

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An associative right  (or, equivalently, left) [[Artinian ring]] with zero [[Jacobson radical|Jacobson radical]]. The [[Wedderburn–Artin theorem]] describes the structure of the classical semi-simple rings. The class of classical semi-simple rings can also be characterized by homological properties (see [[Homological classification of rings]]). Every [[group algebra]] of a finite group over a field of characteristic coprime with the order of the group is a classical semi-simple ring. Commutative classical semi-simple rings are finite direct sums of fields. Connected with classical semi-simple rings is Goldie's theorem, which states that a ring has a left classical ring of fractions that is a classical semi-simple ring if and only if it satisfies the maximum condition for left annihilators and does not contain any infinite direct sums of left ideals.
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An associative right  (or, equivalently, left) [[Artinian ring]] with zero [[Jacobson radical|Jacobson radical]]. The [[Wedderburn–Artin theorem]] describes the structure of the classical semi-simple rings. The class of classical semi-simple rings can also be characterized by homological properties (see [[Homological classification of rings]]). Every [[group algebra]] of a finite group over a field of [[Characteristic of a field|characteristic]] coprime with the order of the group is a classical semi-simple ring. Commutative classical semi-simple rings are finite direct sums of fields. Connected with classical semi-simple rings is Goldie's theorem, which states that a ring has a left classical ring of fractions that is a classical semi-simple ring if and only if it satisfies the maximum condition for left annihilators and does not contain any infinite direct sums of left ideals.
  
 
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[[Category:Associative rings and algebras]]
 
[[Category:Associative rings and algebras]]

Latest revision as of 19:44, 19 October 2014

An associative right (or, equivalently, left) Artinian ring with zero Jacobson radical. The Wedderburn–Artin theorem describes the structure of the classical semi-simple rings. The class of classical semi-simple rings can also be characterized by homological properties (see Homological classification of rings). Every group algebra of a finite group over a field of characteristic coprime with the order of the group is a classical semi-simple ring. Commutative classical semi-simple rings are finite direct sums of fields. Connected with classical semi-simple rings is Goldie's theorem, which states that a ring has a left classical ring of fractions that is a classical semi-simple ring if and only if it satisfies the maximum condition for left annihilators and does not contain any infinite direct sums of left ideals.

How to Cite This Entry:
Classical semi-simple ring. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Classical_semi-simple_ring&oldid=33975
This article was adapted from an original article by L.A. Skornyakov (originator), which appeared in Encyclopedia of Mathematics - ISBN 1402006098. See original article