Discrete signal processing on graphs: Graph fourier transform

We propose a novel discrete signal processing framework for the representation and analysis of datasets with complex structure. Such datasets arise in many social, economic, biological, and physical networks. Our framework extends traditional discrete signal processing theory to structured datasets by viewing them as signals represented by graphs, so that signal coefficients are indexed by graph nodes and relations between them are represented by weighted graph edges. We discuss the notions of signals and filters on graphs, and define the concepts of the spectrum and Fourier transform for graph signals. We demonstrate their relation to the generalized eigenvector basis of the graph adjacency matrix and study their properties. As a potential application of the graph Fourier transform, we consider the efficient representation of structured data that utilizes the sparseness of graph signals in the frequency domain.

[1]  Sunil K. Narang,et al.  Perfect Reconstruction Two-Channel Wavelet Filter Banks for Graph Structured Data , 2011, IEEE Transactions on Signal Processing.

[2]  M. Walsh,et al.  An Introduction , 2002, The Counseling Psychologist.

[3]  Peter Lancaster,et al.  The theory of matrices , 1969 .

[4]  Michael I. Jordan Graphical Models , 1998 .

[5]  A. Sandryhaila,et al.  Nearest-neighbor image model , 2012, 2012 19th IEEE International Conference on Image Processing.

[6]  Michael G. Rabbat,et al.  Approximating signals supported on graphs , 2012, 2012 IEEE International Conference on Acoustics, Speech and Signal Processing (ICASSP).

[7]  Jerry D. Gibson,et al.  Handbook of Image and Video Processing , 2000 .

[8]  Markus Püschel,et al.  Algebraic Signal Processing Theory: Foundation and 1-D Time , 2008, IEEE Transactions on Signal Processing.

[9]  Mark Newman,et al.  Networks: An Introduction , 2010 .

[10]  F. R. Gantmakher The Theory of Matrices , 1984 .

[11]  José M. F. Moura,et al.  Algebraic Signal Processing Theory: 1-D Space , 2008, IEEE Transactions on Signal Processing.

[12]  Технология,et al.  National Climatic Data Center , 2011 .

[13]  Lada A. Adamic,et al.  The political blogosphere and the 2004 U.S. election: divided they blog , 2005, LinkKDD '05.

[14]  Ulrike von Luxburg,et al.  A tutorial on spectral clustering , 2007, Stat. Comput..

[15]  José M. F. Moura,et al.  Discrete Signal Processing on Graphs , 2012, IEEE Transactions on Signal Processing.

[16]  Jure Leskovec,et al.  Signed networks in social media , 2010, CHI.

[17]  José M. F. Moura,et al.  Algebraic Signal Processing Theory , 2006, ArXiv.

[18]  Pierre Vandergheynst,et al.  Wavelets on Graphs via Spectral Graph Theory , 2009, ArXiv.