Admissibility For Monomial Representations of Exponential Lie Groups

Abstract

Let G be a simply connected exponential solvable Lie group, H a closed connected subgroup, and let τ be a representation of G induced from a unitary character f of H. The spectrum of τ corresponds via the orbit method to the set G· Aτ / G of coadjoint orbits that meet the spectral variety Aτ = f + . We prove that the spectral measure of τ is absolutely continuous with respect to the Plancherel measure if and only if H acts freely on some point of Aτ. As a corollary we show that if G is nonunimodular, then τ has admissible vectors if and only if the preceding orbital condition holds.