Centre of a group: Difference between revisions

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imported>Richard Pinch
(new entry, just a stub)
 
imported>Richard Pinch
(kernel of morphism to inner automorphism group)
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:<math>Z(G) = \{ z \in G : \forall x \in G,~xz=zx \} . \,</math>
:<math>Z(G) = \{ z \in G : \forall x \in G,~xz=zx \} . \,</math>


The centre is a [[subgroup]], which is [[normal subgroup|normal]] and indeed [[characteristic subgroup|characteristic]].   
The centre is a [[subgroup]], which is [[normal subgroup|normal]] and indeed [[characteristic subgroup|characteristic]].  It is the [[kernel]] of the [[group homomorphism|homomorphism]] to ''G'' to its [[inner automorphism]] group.


==See also==
==See also==

Revision as of 11:57, 15 November 2008

In group theory, the centre of a group is the subset of elements which commute with every element of the group.

Formally,

The centre is a subgroup, which is normal and indeed characteristic. It is the kernel of the homomorphism to G to its inner automorphism group.

See also

References

  • Marshall Hall jr (1959). The theory of groups. New York: Macmillan, 14.