مرکز منطقه ای اطلاع رساني علوم و فناوري - Ring structure and multi-dimensional discrete Fourier transform on a power of 2

DocumentCode :

285542

Title :

Ring structure and multi-dimensional discrete Fourier transform on a power of 2

Author :

Ma, Weizhen

Author_Institution :

Dept. of Electron. & Electr. Eng., South China Univ. of Technol., Guangzhou, China

Volume :

fYear :

1992

fDate :

10-13 May 1992

Firstpage :

1510

Abstract :

An algorithm for computing DFT (2ⁿ; k) is demonstrated based on ring structure. The matrix of DFT (2ⁿ) can be permuted into a block-structured matrix which contains circulant blocks corresponding to the disjoint cosets of kernel group K, being the direct product of a group of order 2 and a cyclic group of order 2^n-2(2^k-1). The circulant blocks can be further permuted into a block-diagonal matrix with identical blocks, each of which is the core of a one-dimensional DFT (discrete Fourier transform), CFT(2ⁱ)

Keywords :

fast Fourier transforms; matrix algebra; DFT; block-diagonal matrix; block-structured matrix; circulant blocks; cyclic group; disjoint cosets; kernel group; multi-dimensional discrete Fourier transform; ring structure; Arithmetic; Discrete Fourier transforms; Fourier transforms; Kernel; Polynomials; Power engineering computing;

fLanguage :

English

Publisher :

ieee

Conference_Titel :

Circuits and Systems, 1992. ISCAS '92. Proceedings., 1992 IEEE International Symposium on

Conference_Location :

San Diego, CA

Print_ISBN :

0-7803-0593-0

Type :

conf

DOI :

10.1109/ISCAS.1992.230213

Filename :

230213

Link To Document :

https://search.ricest.ac.ir/dl/search/defaultta.aspx?DTC=49&DC=285542