The extraspecial case of the 𝑘(𝐺𝑉) problem

Abstract

Let E E be an extraspecial-type group and V V a faithful, absolutely irreducible k [ E ] k[E] -module, where k k is a finite field. Let G G be the normalizer in G L ( V ) GL(V) of E E . We show that, with few exceptions, there exists a v ∈ V v\in V such that the restriction of V V to C H ( v ) C_H(v) is self-dual whenever H ≤ G H\le G and ( | H | , | V | ) = 1 (\vert H\vert , \vert V\vert )=1 .