Title :
A general scrambling rule for multidimensional FFT algorithms
Author :
Bernardini, Riccardo ; Cortelazzo, G.M. ; Mian, G.A.
Author_Institution :
Dipartimento di Elettronica e Inf., Padova Univ., Italy
fDate :
7/1/1994 12:00:00 AM
Abstract :
This work determines the scrambling rule of the multidimensional Cooley-Tukey FFT, and of the multidimensional prime factor FFT, in complete generality, i.e., for signals defined on lattices of general type. The characteristics of the scrambling rule bear interesting similarities with the 1-D case: the scrambling can be performed on the input data and it can be eliminated from the operations requiring pairs of FFT and inverse FFT (e.g. convolutions and correlations). The results of this work allow one to derive the most efficient way of performing multidimensional scrambling. The consequent memory access savings are relevant, especially with arrays of sizable dimensions
Keywords :
fast Fourier transforms; signal processing; arrays; convolutions; correlations; general scrambling rule; input data; inverse FFT; memory access savings; multidimensional Cooley-Tukey FFT; multidimensional FFT algorithms; multidimensional prime factor FFT; multidimensional scrambling; Array signal processing; Computational efficiency; Convolution; Helium; Lattices; Multidimensional signal processing; Multidimensional systems; Signal processing; Signal processing algorithms; TV;
Journal_Title :
Signal Processing, IEEE Transactions on
