In abstract algebra, the center of a group is the set of elements that commute with every element of . It is denoted , from German , meaning center. In set-builder notation,
The center is a normal subgroup, , and also a characteristic subgroup, but is not necessarily fully characteristic. The quotient group, , is isomorphic to the inner automorphism group, .
A group is abelian if and only if . At the other extreme, a group is said to be centerless if is trivial; i.e., consists only of the identity element.
The elements of the center are central elements.
The center of G is always a subgroup of . In particular:
Furthermore, the center of is always an abelian and normal subgroup of . Since all elements of commute, it is closed under conjugation.
A group homomorphism might not restrict to a homomorphism between their centers. The image elements commute with the image , but they need not commute with all of unless is surjective. Thus the center mapping is not a functor between categories Grp and Ab, since it does not induce a map of arrows.
By definition, an element is central whenever its conjugacy class contains only the element itself; i.e. .
The center is the intersection of all the centralizers of elements of : <blockquote> </blockquote>As centralizers are subgroups, this again shows that the center is a subgroup.
Consider the map , from to the automorphism group of defined by , where is the automorphism of defined by
The function, is a group homomorphism, and its kernel is precisely the center of , and its image is called the inner automorphism group of , denoted . By the first isomorphism theorem we get,
The cokernel of this map is the group of outer automorphisms, and these form the exact sequence
Quotienting out by the center of a group yields a sequence of groups called the upper central series:
The kernel of the map is the th center of (second center, third center, etc.), denoted . Concretely, the ()-st center comprises the elements that commute with all elements up to an element of the 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.
The ascending chain of subgroups
stabilizes at i (equivalently, ) if and only if is centerless.