This paper describes the dyadic convolutional theorem and proof of the Walsh function. The first section of the paper details how to make the tree of a Walsh variable. The second section describes how to make the tree of a Walsh function. The third section uses the above two trees in order to provide the lemma for the theorem. The fourth section discusses the application of digital signal processing for audio sounds.

Author: Imai, Y.
Affiliation: Tokay University Junior College, Tokyo, Japan
AES Convention: 100 (May 1996) Paper Number: 4213
Publication Date: May 1, 1996 Import into BibTeX
Subject: Signal Processing
Permalink: https://www.aes.org/e-lib/browse.cfm?elib=7559

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