Non-monomial multiplier representations of abelian groups

We present an efficient algorithm that decomposes a monomial representation of a solvable group G into its irreducible components. In contradistinction to other approaches, we also compute the decomposition matrix A in the form of a product of highly structured, sparse matrices. This factorization p

Let G be a finite elementary abelian p-group. Given a 2-cocycle ␣ of G over the field of complex numbers, we show how to construct an irreducible projective representation of G with 2-cocycle in the cohomology class of ␣. Let S be a 2 ## Ž . subgroup of G of index dividing p . Then we also count

We prove that if G G is the 2-local parabolic geometry of the sporadic simple group Ž . Ž . Ž . F the Monster or F the Baby Monster then R G G ( F or 2 и F , respectively.

Monomial representations of familiar finite groups over finite fields are used to Ž . construct infinite semi-direct products of free products of cyclic groups by groups of monomial automorphisms. Finite homomorphic images of these progenitors in which the actions on the group of automorphisms and o