12 pagesInternational audienceDetermining the number of relevant dimensions in the eigen-space of a graph Laplacian matrix is a central issue in many spectral graph-mining applications. We tackle here the sub-problem of finding the "right" dimensionality of Laplacian matrices, especially those often encountered in the domains of social or biological graphs: the ones underlying large, sparse, unoriented and unweighted graphs with a power-law degree distribution. We present here the application of a randomization test to this problem. We validate our approach first on an artificial sparse and powerlaw type graph, with two intermingled clusters, then on two real-world social graphs ("Football-league", "Mexican Politician Network"), where the a...
AbstractSpectra and representations of some special weighted graphs are investigated with weight mat...
Spectral algorithms, such as principal component analysis and spectral clustering, rely on the extre...
International audienceIn this work, we study the spectrum of the normalized Laplacian and its regula...
12 pagesInternational audienceDetermining the number of relevant dimensions in the eigen-space of a ...
National audienceDetermining the number of relevant dimensions in the eigen-space of a graph Laplaci...
12 pNational audienceDetermining the number of relevant dimensions in the eigen-space of a graph Lap...
International audienceLaplacian low-rank approximations are much appreciated in the context of graph...
ISBN : 978-3-7908-2603-6International audienceDetermining the number of relevant dimensions in the e...
The graph Laplacian, a typical representation of a network, is an important matrix that can tell us ...
How does coarsening affect the spectrum of a general graph? We provide conditions such that the prin...
International audienceSpectral techniques have proved amongst the most effective approaches to graph...
The smallest eigenvalues and the associated eigenvectors (i.e., eigenpairs) of a graph Laplacian mat...
We study random graphs with possibly different edge probabilities in the challenging sparse regime o...
International audienceNetwork geometries are typically characterized by having a finite spectral dim...
Abstract. We study random graphs with possibly different edge prob-abilities in the challenging spar...
AbstractSpectra and representations of some special weighted graphs are investigated with weight mat...
Spectral algorithms, such as principal component analysis and spectral clustering, rely on the extre...
International audienceIn this work, we study the spectrum of the normalized Laplacian and its regula...
12 pagesInternational audienceDetermining the number of relevant dimensions in the eigen-space of a ...
National audienceDetermining the number of relevant dimensions in the eigen-space of a graph Laplaci...
12 pNational audienceDetermining the number of relevant dimensions in the eigen-space of a graph Lap...
International audienceLaplacian low-rank approximations are much appreciated in the context of graph...
ISBN : 978-3-7908-2603-6International audienceDetermining the number of relevant dimensions in the e...
The graph Laplacian, a typical representation of a network, is an important matrix that can tell us ...
How does coarsening affect the spectrum of a general graph? We provide conditions such that the prin...
International audienceSpectral techniques have proved amongst the most effective approaches to graph...
The smallest eigenvalues and the associated eigenvectors (i.e., eigenpairs) of a graph Laplacian mat...
We study random graphs with possibly different edge probabilities in the challenging sparse regime o...
International audienceNetwork geometries are typically characterized by having a finite spectral dim...
Abstract. We study random graphs with possibly different edge prob-abilities in the challenging spar...
AbstractSpectra and representations of some special weighted graphs are investigated with weight mat...
Spectral algorithms, such as principal component analysis and spectral clustering, rely on the extre...
International audienceIn this work, we study the spectrum of the normalized Laplacian and its regula...