enigmahunter
Oct30-08, 11:03 PM
A topological continuous mapping can induce a group homomorphism as shown here (http://en.wikipedia.org/wiki/Fundamental_group).
Is there any example that a group action on a set as a group homomorphism (from the group into its symmetric group) induces a topological continuous mapping?
Thanks.
Is there any example that a group action on a set as a group homomorphism (from the group into its symmetric group) induces a topological continuous mapping?
Thanks.