Centraliser: Difference between revisions

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In group theory, the centraliser of a subset of a group (mathematics) is the set of all group elements which commute with every element of the given subset.

Formally, for S a subset of a group G, we define

C_{G}(S)=\{g\in G:\forall s\in S,~gs=sg\}.\,

The centraliser of any set is a subgroup of G, and the centraliser of S is equal to the centraliser of the subgroup $\langle S\rangle$ generated by the subset S.

The centraliser of the empty set is the whole group G; the centraliser of the whole group G is the centre of G.

@@ Line 6: / Line 6: @@
 :<math> C_G(S) = \{ g \in G : \forall s \in S,~ gs=sg \} . \, </math>
-The centraliser of any set is a [[subgroup]] of ''G'', and the centraliser of ''S'' is equal to the centraliser of of the subgroup <math>\langle S \rangle</math> generated by the subset ''S''.
+The centraliser of any set is a [[subgroup]] of ''G'', and the centraliser of ''S'' is equal to the centraliser of the subgroup <math>\langle S \rangle</math> generated by the subset ''S''.
 The centraliser of the [[empty set]] is the whole group ''G''; the centraliser of the whole group ''G'' is the [[centre of a group|centre]] of ''G''.

Centraliser: Difference between revisions

Revision as of 12:19, 29 December 2008

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