1990
DOI: 10.1109/29.106864
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Fourier analysis and signal processing by use of the Mobius inversion formula

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Cited by 63 publications
(48 citation statements)
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“…Then, the arithmetic Hartley transform can be derived by the use of modified Möbius inversion formula for finite series [1].…”
Section: Lemma 1 (Fundamental Property)mentioning
confidence: 99%
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“…Then, the arithmetic Hartley transform can be derived by the use of modified Möbius inversion formula for finite series [1].…”
Section: Lemma 1 (Fundamental Property)mentioning
confidence: 99%
“…Usual arithmetic theory deals with spectrum approximations via zero-or first-order interpolation [1,3,7]. The analysis presented in this work allows a more encompassing perception of the interpolation mechanisms and gives mathematical tools for establishing validation constraints to such interpolation process.…”
Section: Corollary 1 Inverse Discrete Hartley Transform Components Camentioning
confidence: 99%
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“…Similar, but different, algorithms were studied by Tufts and Sadasiv [2], Schiff and Walker [3] for the calculation of the Fourier coefficients of even periodic functions. This method was extended in [4] for the calculation of the Fourier coefficients of both the even and odd components of a periodic function. The Bruns approach was incorporated in [5] resulting in a more computationally balanced algorithm.…”
Section: Introductionmentioning
confidence: 99%