Representations of McLain groups

Abstract: Abstract. Basic modules of McLain groups M = M (Λ, ≤, R) are defined and investigated. These are (possibly infinite dimensional) analogues of André's supercharacters of Un(q). The ring R need not be finite or commutative and the field underlying our representations is essentially arbitrary: we deal with all characteristics, prime or zero, on an equal basis. The set Λ, totally ordered by ≤, is allowed to be infinite. We show that distinct basic modules are disjoint, determine the dimension of the endomorphism a… Show more

“…We refer the reader to [7,10,11,16] for examples and details. For the case when A is not necessarily finite and F need not be C see [15], which studies irreducible modules of McLain groups defined over rings admitting such linear characters. In terms of applications, perhaps the prime example is the following.…”

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

“…We refer the reader to [7,10,11,16] for examples and details. For the case when A is not necessarily finite and F need not be C see [15], which studies irreducible modules of McLain groups defined over rings admitting such linear characters. In terms of applications, perhaps the prime example is the following.…”

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