Title :
Fast computation of the discrete Walsh and Hadamard transforms
Author :
Sundararajan, Duraisamy ; Ahmad, M. Omair
Author_Institution :
Dept. of Electr. & Comput. Eng., Concordia Univ., Montreal, Que., Canada
fDate :
6/1/1998 12:00:00 AM
Abstract :
The discrete Walsh and Hadamard transforms are often used in image processing tasks such as image coding, pattern recognition, and sequency filtering. A new discrete Walsh transform (DWT) algorithm is derived in which a modified form of the DWT relation is decomposed into smaller-sized transforms using vectorized quantities. A new sequency-ordered discrete Hadamard transform (DHAT) algorithm is also presented. The proposed approach results in more regular algorithms requiring no independent data swapping and fewer array-index updating and bit-reversal operations. An analysis of the computational complexity and the execution time performance are provided. The results are compared with those of the existing algorithms
Keywords :
Hadamard transforms; Walsh functions; computational complexity; digital arithmetic; filtering theory; image coding; pattern recognition; signal flow graphs; transform coding; array-index updating; bit-reversal operations; computational complexity; discrete Hadamard transform; discrete Walsh transform algorithm; execution time; fast computation; image coding; image processing; pattern recognition; sequency filtering; sequency-ordered discrete Hadamard transform; signal flow graph; software implementation; vectorized quantities; Computational complexity; Discrete transforms; Discrete wavelet transforms; Error correction; Error correction codes; Filtering; Image coding; Image processing; Pattern recognition; Performance analysis;
Journal_Title :
Image Processing, IEEE Transactions on
