In order to analyze signals defined over graphs, many concepts from the classical signal processing theory have been extended to the graph case. One of these concepts is the uncertainty principle, which studies the concentration of a signal on a graph and its graph Fourier basis (GFB). An eigenvector of a graph is the most localized signal in the GFB by definition, whereas it may not be localized in the vertex domain. However, if the eigenvector itself is sparse, then it is concentrated in both domains simultaneously. In this regard, this paper studies the necessary and sufficient conditions for the existence of 1, 2, and 3-sparse eigenvectors of the graph Laplacian. The provided conditions are purely algebraic and only use the adjacency in...
Abstract. We examine the empirical distribution of the eigenvalues and the eigenvectors of adjacency...
12 pagesInternational audienceDetermining the number of relevant dimensions in the eigen-space of a ...
Abstract. We consider Schrödinger operators on sparse graphs. The geomet-ric definition of sparsenes...
In order to analyze signals defined over graphs, many concepts from the classical signal processing ...
Analysis of signals defined over graphs has been of interest in the recent years. In this regard, ma...
Uncertainty principles present an important theoretical tool in signal processing, as they provide l...
This paper advances a new way to formulate the uncertainty principle for graphs, by using a non-loca...
With the objective of employing graphs toward a more generalized theory of signal processing, we pre...
The graph Laplacian, a typical representation of a network, is an important matrix that can tell us ...
Learning a suitable graph is an important precursor to many graph signal processing (GSP) tasks, suc...
AbstractOne of the fundamental properties of a graph is the number of distinct eigenvalues of its ad...
Graph inference plays an essential role in machine learning, pattern recognition, and classification...
International audienceAn important requirement in the field of signal processing on graphs is the ne...
International audienceSignal processing on graphs is a recent research domain that aims at generaliz...
AbstractIf G is a graph, its Laplacian is the difference of the diagonal matrix of its vertex degree...
Abstract. We examine the empirical distribution of the eigenvalues and the eigenvectors of adjacency...
12 pagesInternational audienceDetermining the number of relevant dimensions in the eigen-space of a ...
Abstract. We consider Schrödinger operators on sparse graphs. The geomet-ric definition of sparsenes...
In order to analyze signals defined over graphs, many concepts from the classical signal processing ...
Analysis of signals defined over graphs has been of interest in the recent years. In this regard, ma...
Uncertainty principles present an important theoretical tool in signal processing, as they provide l...
This paper advances a new way to formulate the uncertainty principle for graphs, by using a non-loca...
With the objective of employing graphs toward a more generalized theory of signal processing, we pre...
The graph Laplacian, a typical representation of a network, is an important matrix that can tell us ...
Learning a suitable graph is an important precursor to many graph signal processing (GSP) tasks, suc...
AbstractOne of the fundamental properties of a graph is the number of distinct eigenvalues of its ad...
Graph inference plays an essential role in machine learning, pattern recognition, and classification...
International audienceAn important requirement in the field of signal processing on graphs is the ne...
International audienceSignal processing on graphs is a recent research domain that aims at generaliz...
AbstractIf G is a graph, its Laplacian is the difference of the diagonal matrix of its vertex degree...
Abstract. We examine the empirical distribution of the eigenvalues and the eigenvectors of adjacency...
12 pagesInternational audienceDetermining the number of relevant dimensions in the eigen-space of a ...
Abstract. We consider Schrödinger operators on sparse graphs. The geomet-ric definition of sparsenes...