Title :
A generalized reverse jacket transform
Author :
Lee, Moon Ho ; Rajan, B. Sundar ; Park, J.Y.
Author_Institution :
Inst. of Inf. & Commun., Chonbuk Nat. Univ., Chonju, South Korea
fDate :
7/1/2001 12:00:00 AM
Abstract :
Generalization of the well-known Walsh-Hadamard transform (WHT), namely center-weighted Hadamard transform (CWHT) and complex reverse-jacket transform (CRJT) have been proposed and their fast implementation and simple index generation algorithms have recently been reported. These transforms are of size 2r×2r for integral values or r, and defined in terms of binary radix representation of integers. In this paper, using appropriate mixed-radix representation of integers, we present a generalized transform called general reverse jacket transform (GRJT) that unifies all the three classes of transforms, WHT, CWHT, and CRJT, and is also applicable for any even length vectors, that is of size 2r×2r . A subclass of GRJT which includes CRJT (but not CWHT) is applicable for finite fields and useful for constructing error control codes
Keywords :
Hadamard transforms; Walsh functions; error correction codes; image coding; Walsh-Hadamard transform; binary radix representation; center-weighted Hadamard transform; complex reverse-jacket transform; error control codes; even length vectors; finite fields; generalized reverse jacket transform; index generation algorithms; mixed-radix representation; subclass; Discrete Fourier transforms; Error correction; Fourier transforms; Galois fields; Helium; Image coding; Lifting equipment; Moon; Signal processing; Signal processing algorithms;
Journal_Title :
Circuits and Systems II: Analog and Digital Signal Processing, IEEE Transactions on
