Orthonormal Bases in the Orbit of Square-Integrable Representations of Nilpotent Lie Groups

Abstract

Let G be a connected, simply connected nilpotent group and π be a square-integrable irreducible unitary representation modulo its center Z(G) on L2(Rd). We prove that under reasonably weak conditions on G and π there exist a discrete subset of G/Z(G) and some (relatively) compact set F ⊂eq Rd such that \ |F|-1/2 2pt π(γ) 1F γ ∈ \ forms an orthonormal basis of L2(Rd). This construction generalizes the well-known example of Gabor orthonormal bases in time-frequency analysis. The main theorem covers graded Lie groups with one-dimensional center. In the presence of a rational structure, the set can be chosen to be a uniform subgroup of G/Z.