Frame-like Fourier expansions for finite Borel measures on R

Abstract

It is known that if a finite Borel measure μ on [0,1) possesses a frame of exponential functions for L2(μ), then μ is of pure type. In this paper, we prove the existence of a class of finite Borel measures μ on [0,1) that are not of pure type that possess frame-like Fourier expansions for L2(μ). We also show properties and classifications of certain measures possessing this type of Fourier expansion. Additionally, we establish a frame-like Fourier expansion for L2(μ) where μ is a singular Borel probability measure on R. Finally, we show measures μ on [0,1) that possess these frame-like Fourier expansions for L2(μ) have all f∈ L2(μ) as L2(μ) limits of harmonic functions with frame-like coefficients. We also discuss when the inner products of these expansions coincide with model spaces and subspaces of harmonic functions on the disk.