Representations of finite pattern groups

Abstract

Let G=1+A be a finite pattern group over the finite field Fq. We give a natural bijection between coadjoint orbits of G and its equivalent classes of irreducible representations. More precisely, given any T∈ At, viewed as a representative of associated coadjoint orbit OT of G, we can explicitly construct a subgroup HT of G, such that IndHTG T is irreducible and IndHTG T IndHT'G T' if and only if T and T' are in the same coadjoint orbit. Here T(x)=(tr Tx) for x∈ HT, and is a fixed nontrivial additive character of Fq.