Quaternionic wavelets

Title: Quaternionic wavelets
Creator: Hogan, J. A.; Morris, Andrew Joel
Relation: Numerical Functional Analysis and Optimization Vol. 33, Issue 7-9, p. 1031-1062
Publisher Link: http://dx.doi.org/10.1080/01630563.2012.682140
Publisher: Taylor & Francis
Resource Type: journal article
Date: 2012
Description: Quaternion-valued functions have been used as a model for colour images and have recently been studied using various Fourier-type transforms. We develop some fundamental wavelet theory for quaternionic signals using the Fourier kernel introduced by Brackx, De Schepper, and Sommen in [1]. We present several analogs to classical wavelet theory, such as the quadrature mirror filter condition. We also include necessary design conditions for a wavelet basis to have desired regularity and sufficient design conditions which will guarantee compact support. Due to the difficulty in constructing orthogonal wavelet bases, we present some theory for biorthogonal wavelet bases and construct a few examples.
Subject: biorthogonal wavelets; color images; fourier transform; orthogonal wavelets; quaternions; primary 42C40; secondary 94A12
Identifier: http://hdl.handle.net/1959.13/1057185
Identifier: uon:16148
Identifier: ISSN:0163-0563
Language: eng
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