Title :
The generalized Haar-Walsh transform
Author :
Irion, Jeff ; Saito, Nobuo
Author_Institution :
Dept. of Math., Univ. of California, Davis, Davis, CA, USA
fDate :
June 29 2014-July 2 2014
Abstract :
We introduce a novel multiscale transform for signals on graphs which is a generalization of the classical Haar and Walsh-Hadamard Transforms. Using a recursive partitioning of the graph and successive averaging and differencing operations, our transform generates an overcomplete dictionary of orthonormal bases. We describe how to adapt the classical best-basis search algorithm to this setting, and show results from preliminary denoising experiments.
Keywords :
Haar transforms; Walsh functions; graph theory; search problems; signal processing; Haar and Walsh-Hadamard transform; best-basis search algorithm; generalized Haar-Walsh transform; multiscale transform; orthonormal bases; Dictionaries; Laplace equations; Partitioning algorithms; Signal processing; Signal processing algorithms; Transforms; Vectors; Fiedler vectors; multiscale basis dictionaries; spectral graph partitioning; wavelets on graphs;
Conference_Titel :
Statistical Signal Processing (SSP), 2014 IEEE Workshop on
Conference_Location :
Gold Coast, VIC
DOI :
10.1109/SSP.2014.6884678
