The Sampling Theorem and Several Equivalent Results in Analysis |
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| Authors: | J. R. Higgins G. Schmeisser J. J. Voss |
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| Affiliation: | (1) Division of Mathematics and Statistics, Anglia Polytechnic University, Cambridge, England;(2) Mathematisches Institut, Universität Erlangen-Nürnberg, D-91054 Erlangen, Germany |
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| Abstract: | First we show that several fundamental results on functions from theBernstein spaces  (such as Bernstein's inequality andthe reproducing formula) can be deduced from a weak form of the classicalsampling theorem. In §3 we discuss the mutual equivalence of thesampling theorem, the derivative sampling theorem and a harmonic functionsampling theorem. In §§4–6 we discuss connections between thesampling theorem and various important results in complex analysis andFourier analysis. Our considerations include Cauchy's integral formula,Poisson's summation formula, a Gaussian integral, certain properties ofweighted Hermite polynomials, Plancherel's theorem, the maximum modulusprinciple, and the Phragmén–Lindelöf principle. |
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| Keywords: | sampling theorem Cauchy's integral formula Poisson's summation formula Fourier analysis complex analysis |
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