DocumentCode :
36499
Title :
Author :
Tanaka, Yuichi ; Sakiyama, Akie
Author_Institution :
Grad. Sch. of BASE, Tokyo Univ. of Agric. & Technol., Tokyo, Japan
Volume :
62
Issue :
14
fYear :
2014
fDate :
15-Jul-14
Firstpage :
3578
Lastpage :
3590
Abstract :
This paper proposes M-channel oversampled filter banks for graph signals. The filter set satisfies the perfect reconstruction condition. A method of designing oversampled graph filter banks is presented that allows us to design filters with arbitrary parameters, unlike the conventional critically sampled graph filter banks. The oversampled graph Laplacian matrix is also introduced with a discussion of the entire redundancy of the oversampled graph signal processing system. The practical performance of the proposed filter banks is validated through graph signal denoising experiments.
Keywords :
Laplace equations; channel bank filters; graph theory; matrix algebra; signal denoising; signal reconstruction; signal sampling; M-channel oversampled graph filter banks; arbitrary parameters; graph signal denoising; graph signal processing system; oversampled graph Laplacian matrix; perfect reconstruction condition; Bipartite graph; Image reconstruction; Laplace equations; Spectral analysis; Wavelet transforms; Graph filter banks; graph signal denoising; graph signal processing; graph wavelets; oversampled filter banks;
fLanguage :
English
Journal_Title :
Signal Processing, IEEE Transactions on
Publisher :
ieee
ISSN :
1053-587X
Type :
jour
DOI :
10.1109/TSP.2014.2328983
Filename :
6825829
Link To Document :
