Extensions of theorems of Gasch\"utz, Zmud' and Rhodes on faithful representations

Abstract

Gasch\"utz (1954) proved that a finite group G has a faithful irreducible complex representation if and only if its socle is generated by a single element as a normal subgroup; this result extends to arbitrary fields of characteristic p so long as G has no nontrivial normal p-subgroup. Zmud' (1956) showed that the minimum number of irreducible constituents in a faithful complex representation of G coincides with the minimum number of generators of its socle as a normal subgroup; this result can also be extended to arbitrary fields of any characteristic p such that G has no nontrivial normal p-subgroup (i.e., over which G admits a faithful completely reducible representation). Rhodes (1969) characterized the finite semigroups admitting a faithful irreducible representation over an arbitrary field as generalized group mapping semigroups over a group admitting a faithful irreducible representation over the field in question. Here, we provide a common generalization of the theorems of Zmud' and Rhodes by determining the minimum number of irreducible constituents in a faithful completely reducible representation of a finite semigroup over an arbitrary field (provided that it has one). Our key tool for the semigroup result is a relativized version of Zmud''s theorem that determines, given a finite group G and a normal subgroup N G, what is the minimum number of irreducible constituents in a completely reducible representation of G whose restriction to N is faithful.