Abstract
AbstractLet
$\alpha $
be a complex-valued
$2$
-cocycle of a finite group
$G.$
A new concept of strict
$\alpha $
-regularity is introduced and its basic properties are investigated. To illustrate the potential use of this concept, a new proof is offered to show that the number of orbits of G under its action on the set of complex-valued irreducible
$\alpha _N$
-characters of N equals the number of
$\alpha $
-regular conjugacy classes of G contained in
$N,$
where N is a normal subgroup of
$G.$
Publisher
Cambridge University Press (CUP)