Riesz bases in L2(0,1) related to sampling in shift-invariant spaces

The Fourier duality is an elegant technique to obtain sampling formulas in Paley-Wiener spaces. In this paper it is proved that there exists an analogue of the Fourier duality technique in the setting of shift-invariant spaces. In fact, any shift-invariant space Vφ with a stable generator φ is the range space of a bounded one-to-one linear operator T between L2(0,1) and L2(R). Thus, regular and irregular sampling formulas in Vφ are obtained by transforming, via T, expansions in L2(0,1) with respect to some appropriate Riesz bases.