Balian-Low type theorems on homogeneous groups

Abstract

We prove strict necessary density conditions for coherent frames and Riesz sequences on homogeneous groups. Let N be a connected, simply connected nilpotent Lie group with a dilation structure (a homogeneous group) and let (π, Hπ) be an irreducible, square-integrable representation modulo the center Z(N) of N on a Hilbert space Hπ of formal dimension dπ . If g ∈ Hπ is an integrable vector and the set \ π (λ )g : λ ∈ \ for a discrete subset ⊂eq N / Z(N) forms a frame for Hπ, then its density satisfies the strict inequality D-( )> dπ , where D-( ) is the lower Beurling density. An analogous density condition D+() < dπ holds for a Riesz sequence in Hπ contained in the orbit of (π, Hπ). The proof is based on a deformation theorem for coherent systems, a universality result for p-frames and p-Riesz sequences, some results from Banach space theory, and tools from the analysis on homogeneous groups.