Title :
A generalized Mobius transform, arithmetic Fourier transforms, and primitive roots
Author_Institution :
Dept. of Inf. Technol., INTEC, Ghent, Belgium
fDate :
5/1/1996 12:00:00 AM
Abstract :
A general approach to arithmetic Fourier transforms is developed. The implementation is based on sine and cosine “killer” procedures pertaining to a generalized Mobius transform involving reduced periodic multiplicative arithmetical functions. It is shown that cosine killer procedures exist whenever one half of Euler´s totient function of the order of the transform is odd. Primitive roots and indices with respect to primitive roots play an important part in the derivation of the results
Keywords :
Fourier transforms; arithmetic; Euler´s totient function; arithmetic Fourier transforms; cosine killer procedures; generalized Mobius transform; indices; primitive roots; reduced periodic multiplicative arithmetical functions; sine killer procedures; Acoustic signal detection; Arithmetic; Convergence; Fourier transforms; Gaussian processes; Signal analysis; Signal processing; Signal processing algorithms; Statistical distributions; Taylor series;
Journal_Title :
Signal Processing, IEEE Transactions on
