ENCYCLOPEDIA 4U .com



Encyclopedia Home Page
Google
  Web Encyclopedia4u.com

 

Center of a group

In abstract algebra, the center (or centre) of a group G is the set, usually denoted Z(G), which includes each element z of G which commutes with all elements of G. In other words, z is in Z(G) if and only if, for each g in G, gz = zg.

Z(G) is a subgroup of G: in fact, if x and y are in Z(G), then for each g in G

(xy)g = x(yg) = x(gy) = (xg)y = (gx)y = g(xy)
so xy is in Z(G) as well; and a similar argument applies to inverses.

Moreover, Z(G) is an abelian subgroup of G, and a normal subgroup of G, and even a characteristic subgroup of it.

See also center (algebra).


Content on this web site is provided for informational purposes only. We accept no responsibility for any loss, injury or inconvenience sustained by any person resulting from information published on this site. We encourage you to verify any critical information with the relevant authorities.



Copyright © 2005 Par Web Solutions All Rights reserved.
| Privacy

This article is licensed under the GNU Free Documentation License. It uses material from the Wikipedia article "Center of a group".