Center of a group Guide, Meaning , Facts, Information and Description
In abstract algebra, the center (or centre) of a group G is the set Z(G) of all elements in G which commute with all the elements of G. Specifically,- Z(G) = {z ∈ G | gz = zg for all g ∈ G}
Moreover, Z(G) is an abelian subgroup of G, a normal subgroup of G, and even a characteristic subgroup of it.
If G is an abelian group then the center of G is all of G. At the other extreme, a group is said to be centerless if Z(G) is trivial.
Consider the map f: G → Aut(G) to the automorphism group of G defined by f(g)(h) = ghg−1. The kernel of this map is the center of G and the image is called the inner automorphism group of G, denoted Inn(G). By the first isomorphism theorem G/Z(G) ≅ Inn(G).
See also:
This is an Article on Center of a group. Page Contains Information, Facts Details or Explanation Guide About Center of a group