Shannon's sampling theorem in a distributional setting
Abstract
The classical Shannon sampling theorem states that a signal f with Fourier transform F in L2(R) having its support contained in (-π,π) can be recovered from the sequence of samples (f(n))n in Z via f(t)=Σn in Z f(n) (sin(π (t -n)))/(π (t-n)) (t in R). In this article we prove a generalization of this result under the assumption that F is a compactly supported distribution with its support contained in (-π,π).
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