Title :
3-D planar quadrantal and diagonal symmetry-based Winograd Fourier transform algorithm
Author :
Rajaravivarma, V. ; Rajaravivarma, Rathika
Author_Institution :
Morehead State Univ., KY, USA
Abstract :
A fast algorithm for computing the discrete Fourier transform (DFT) of single planar quadrantal symmetric data is discussed. The algorithm is developed employing the techniques of the multidimensional Winograd Fourier transform algorithm (WFTA). It is found that an interesting relationship exists between the quadrantal and diagonal symmetries when the length of the data along each axis is odd. This implies that from one set of symmetry-based WFTA, the other set can be obtained, and the mapping is one-to-one. This idea is formulated, and the single planar diagonal symmetry-based WFTA is derived from single planar quadrantally symmetric WFTA
Keywords :
axial symmetry; computational complexity; discrete Fourier transforms; matrix multiplication; multidimensional digital filters; multidimensional systems; stereo image processing; discrete Fourier transform; fast algorithm; mapping; multidimensional Winograd Fourier transform algorithm; planar diagonal symmetry-based WFTA; planar quadrantally symmetric WFTA; Biomedical signal processing; Computer industry; Discrete Fourier transforms; Fourier transforms; Information filtering; Information filters; Multidimensional signal processing; Radar signal processing; Signal processing; Signal processing algorithms;
Conference_Titel :
System Theory, 1993. Proceedings SSST '93., Twenty-Fifth Southeastern Symposium on
Conference_Location :
Tuscaloosa, AL
Print_ISBN :
0-8186-3560-6
DOI :
10.1109/SSST.1993.522834
