Frames generated by compact group actions

Abstract

Let K be a compact group, and let be a representation of K on a Hilbert space H. We classify invariant subspaces of H in terms of range functions, and investigate frames of the form \() fi\ ∈ K, i ∈ I. This is done first in the setting of translation invariance, where K is contained in a larger group G and is left translation on H = L2(G). For this case, our analysis relies on a new, operator-valued version of the Zak transform. For more general representations, we develop a calculational system known as a "bracket" to analyze representation structures and frames with a single generator. Several applications are explored. Then we turn our attention to frames with multiple generators, giving a duality theorem that encapsulates much of the existing research on frames generated by finite groups, as well as classical duality of frames and Riesz sequences.