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Center (algebra) - Wikipedia, the free encyclopedia

Center (algebra)

From Wikipedia, the free encyclopedia

The term center or centre is used in various contexts in abstract algebra to denote the set of all those elements that commute with all other elements. More specifically:

The center of a group G consists of all those elements x in G such that xg = gx for all g in G. This is a normal subgroup of G.
The center of a ring R is the subset of R consisting of all those elements x of R such that xr = rx for all r in R. The center is a commutative subring of R, so R is an algebra over its center.
The center of an algebra A consists of all those elements x of A such that xa = ax for all a in A. See also: central simple algebra.
The center of a Lie algebra L consists of all those elements x in L such that [x,a] = 0 for all a in L. This is an ideal of the Lie algebra L.
The center of a monoidal category C consists of pairs (A,u) where A is an object of C, and $u:A \otimes - \rightarrow - \otimes A$ a natural isomorphism satisfying certain axioms.

Categories: Abstract algebra

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This page was last modified 13:07, 15 January 2008 by Wikipedia user Swedish fusilier. Based on work by Wikipedia user(s) Reginmund, Grubber, Oleg Alexandrov, VKokielov, Nowhither, Gubbubu, Fropuff, Waltpohl, Maximus Rex, AxelBoldt, Charles Matthews, Michael Hardy and Phys and Anonymous user(s) of Wikipedia.
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