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Sampling formulas involving differences in shift-invariant subspaces: a unified approach. (English) Zbl 1387.42040

Summary: Successive differences on a sequence of data help discover some smoothness features of this data. This was one of the main reasons for rewriting the classical interpolation formula in terms of such data differences. The aim of this paper is to mimic them to a sequence of regular samples of a function in a shift-invariant subspace allowing its stable recovery. A suitable expression for the functions in the shift-invariant subspace by an isomorphism with the \(L^2(0,1)\) space is the key to identify the simple pattern followed by the dual Riesz bases involved in the derived formulas. The paper contains examples illustrating different non-exhaustive situations including also the two-dimensional case.

MSC:

42C15 General harmonic expansions, frames
94A20 Sampling theory in information and communication theory
97N50 Interpolation and approximation (educational aspects)
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