Admissibility For Quasiregular Representations of Exponential Solvable Lie Groups

Abstract

Let N be a simply connected, connected non-commutative nilpotent Lie group with Lie algebra n of dimension n. Let H be a subgroup of the automorphism group of N. Assume that H is a commutative, simply connected, connected Lie group with Lie algebra h. Furthermore, let us assume that the linear adjoint action of h on n is diagonalizable with non-purely imaginary eigenvalues. Let τ=Ind%HN H 1. We obtain an explicit direct integral decomposition for τ, including a description of the spectrum as a sub-manifold of (n+h), a formula for the multiplicity function of the unitary irreducible representations occurring in the direct integral, and a precise intertwining operator. Finally, we completely settle the admissibility question of τ. In fact, we show that if G=N H is unimodular, then τ is never admissible, and if G is nonunimodular, τ is admissible if and only if the intersection of H and the center of G is equal to the identity of the group.