Center (group theory)

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) = {z \in G ∣ \forall g \in G, zg = gz}

.

The center is a normal subgroup, $Z(G) ⊲ G$ . As a subgroup, it is always characteristic, 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 sometimes called central.

As a subgroup

The center of G is always a subgroup of $G$ . In particular:

$Z(G)$ contains the identity element of $G$ , $e$ , because, for all $g \in G$ , it commutes with $g$ , $eg = g = ge$ , by definition;
If $x$ and $y$ are in $Z(G)$ , then so is $xy$ , by associativity: $(xy) g = x (yg) = x (gy) = (xg) y = (gx) y = g (xy)$ for each $g \in G$ ; i.e., $Z(G)$ is closed;
If $x$ is in $Z(G)$ , then so is $x -1$ as, for all $g$ in $G$ , $x -1$ commutes with $g$ : $(gx = xg) \Rightarrow (x -1 gxx -1 = x -1 xgx -1) \Rightarrow (x -1 g = gx -1)$ .

Furthermore, the center of $G$ is always a normal subgroup of $G$ , as it is closed under conjugation, as all elements commute.

Conjugacy classes and centralisers

By definition, the center is the set of elements for which the conjugacy class of each element is the element itself; i.e., $Cl(g) = {g$ }.

The center is also the intersection of all the centralizers of each element of $G$ . As centralizers are subgroups, this again shows that the center is a subgroup.

Conjugation

Consider the map, $f : G \to Aut(G)$ , from $G$ to the automorphism group of $G$ defined by $f (g) = ϕ g$ , where $ϕ g$ is the automorphism of $G$ defined by

f (g)(h) = φ g (h) = ghg -1

.

The function, $f$ is a group homomorphism, and its kernel is precisely the center of $G$ , and its image is called the inner automorphism group of $G$ , denoted $Inn(G)$ . By the first isomorphism theorem we get,

G /Z(G) ≃ Inn(G)

.

The cokernel of this map is the group $Out(G)$ of outer automorphisms, and these form the exact sequence

1 ⟶ Z(G) ⟶ G ⟶ Aut(G) ⟶ Out(G) ⟶ 1

.

Examples

The center of an abelian group, $G$ , is all of $G$ .
The center of the Heisenberg group, $G$ , are all matrices of the form:
${\begin{pmatrix}1&0&z\\0&1&0\\0&0&1\end{pmatrix}}$
The center of a nonabelian simple group is trivial.
The center of the dihedral group, $D n$ , is trivial when $n$ is odd. When $n$ is even, the center consists of the identity element together with the 180° rotation of the polygon.
The center of the quaternion group, $Q 8 = {1, -1, i, -i, j, -j, k, -k}$ , is ${1, -1}$ .
The center of the symmetric group, $S n$ , is trivial for $n \geq 3$ .
The center of the alternating group, $A n$ , is trivial for $n \geq 4$ .
The center of the general linear group, $GL n (F)$ , is the collection of scalar matrices, ${sI n ∣ s \in F∖{0}}$ .
The center of the orthogonal group, $O(n, F)$ is ${I n, -I n}$ .
The center of the special orthogonal group, $SO(n)$ is ${I n, -I n}$ when n is even, and trivial when n is odd.
The center of the unitary group, $U(n)$ is $\{e^{i\theta }\cdot I_{n}|\theta \in [0,2\pi )\}$ .
The center of the special unitary group, $SU(n)$ is $\{e^{i\theta }\cdot I_{n}|\theta ={\frac {2k\pi }{n}},k=0,1,...n-1\}$ .
The center of the multiplicative group of non-zero quaternions is the multiplicative group of non-zero real numbers.
Using the class equation one can prove that the center of any non-trivial finite p-group is non-trivial.
If the quotient group, $G /Z(G)$ , is cyclic, $G$ is abelian (and so $G = Z(G)$ , and $G /Z(G)$ is trivial).

Higher centers

Quotienting out by the center of a group yields a sequence of groups called the upper central series:

(G 0 = G) ⟶ (G 1 = G 0 /Z(G 0)) ⟶ (G 2 = G 1 /Z(G 1)) ⟶ \dots

The kernel of the map, $G \to G i$ is the $i$ th center of $G$ (second center, third center, etc.), and is denoted $Z i (G)$ . Concretely, the ( $i + 1$ )-st center are the terms that commute with all elements up to an element of the $i$ th center. Following this definition, one can define the 0th center of a group to be the identity subgroup. This can be continued to transfinite ordinals by transfinite induction; the union of all the higher centers is called the hypercenter.^{[note 1]}

The ascending chain of subgroups

1 \leq Z(G) \leq Z 2 (G) \leq \dots

stabilizes at i (equivalently, $Z i (G) = Z i+1 (G)$ ) if and only if $G i$ is centerless.

Examples

For a centerless group, all higher centers are zero, which is the case $Z 0 (G) = Z 1 (G)$ of stabilization.
By Grün's lemma, the quotient of a perfect group by its center is centerless, hence all higher centers equal the center. This is a case of stabilization at $Z 1 (G) = Z 2 (G)$ .

Notes

^ This union will include transfinite terms if the UCS does not stabilize at a finite stage.

External links

"Centre of a group", Encyclopedia of Mathematics, EMS Press, 2001 [1994]

[1] This union will include transfinite terms if the UCS does not stabilize at a finite stage.

[note 1]

As a subgroup

Conjugacy classes and centralisers

Conjugation

Examples

Higher centers

Examples

See also

Notes

External links