Irreducible representations of unipotent subgroups of symplectic and unitary groups defined over rings

Abstract

Let A be a ring with 1≠ 0, not necessarily finite, endowed with an involution~*, that is, an anti-automorphism of order ≤ 2. Let Hn(A) be the additive group of all n× n hermitian matrices over A relative to *. Let Un(A) be the subgroup of GLn(A) of all upper triangular matrices with 1's along the main diagonal. Let P=Hn(A) Un(A), where Un(A) acts on Hn(A) by *-congruence transformations. We may view P as a unipotent subgroup of either a symplectic group Sp2n(A), if *=1A (in which case A is commutative), or a unitary group U2n(A) if *≠ 1A. In this paper we construct and classify a family of irreducible representations of P over a field F that is essentially arbitrary. In particular, when A is finite and F= C we obtain irreducible representations of P of the highest possible degree.