Center (group theory)

Cayley table for D4 showing elements of the center, {e, a2}, commute with all other elements (this can be seen by noticing that all occurrences of a given center element are arranged symmetrically about the center diagonal or by noticing that the row and column starting with a given center element are transposes of each other).
e b a a2 a3 ab a2b a3b
e e b a a2 a3 ab a2b a3b
b b e a3b a2b ab a3 a2 a
a a ab a2 a3 e a2b a3b b
a2 a2 a2b a3 e a a3b b ab
a3 a3 a3b e a a2 b ab a2b
ab ab a b a3b a2b e a3 a2
a2b a2b a2 ab b a3b a e a3
a3b a3b a3 a2b ab b a2 a e

In abstract algebra, the center of a group G is the set of elements that commute with every element of G. It is denoted Z(G), from German Zentrum, meaning center. In set-builder notation,

Z(G) = {zG | ∀gG, zg = gz}.

The center is a normal subgroup, Z(G) ⊲ G, and also a characteristic subgroup, but is not necessarily fully characteristic. The quotient group, G / Z(G), is isomorphic to the inner automorphism group, Inn(G).

A group G is abelian if and only if Z(G) = G. At the other extreme, a group is said to be centerless if Z(G) is trivial; i.e., consists only of the identity element.

The elements of the center are central elements.


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