A multiplicity one theorem for groups of type An over discrete valuation rings

Abstract

Let o be the ring of integers of a non-archimedean local field with the maximal ideal and the finite residue field of characteristic p. Let G be the General Linear or Special Linear group with entries from the finite quotients o/ of o and U be the subgroup of G consisting of upper triangular unipotent matrices. We prove that the induced representation IndGU(θ) of G obtained from a non-degenerate character θ of U is multiplicity free for all ≥ 2. This is analogous to the multiplicity one theorem regarding Gelfand-Graev representation for the finite Chevalley groups. We prove that for many cases the regular representations of G are characterized by the property that these are the constituents of the induced representation IndGU(θ) for some non-degenerate character θ of U. We use this to prove that the restriction of a regular representation of General Linear groups over O/ to the Special Linear groups is multiplicity free for all ≥ 2 and also obtain the corresponding branching rules in many cases.