International audienceSignal processing on graphs is a recent research domain that aims at generalizing classical tools in signal processing, in order to analyze signals evolving on complex domains. Such domains are represented by graphs, for which one can compute a particular matrix, called the normalized Laplacian. It was shown that the eigenvalues of this Laplacian correspond to the frequencies of the Fourier domain in classical signal processing. Therefore, the frequency domain is not the same for every support graph. A consequence of this is that there is no non-trivial generalization of Heisenberg's uncertainty principle, that states that a signal cannot be fully localized both in the time domain and in the frequency domain. A way to ...
This thesis addresses statistical estimation and testing of signals over a graph when measurements a...
The subject of analytical uncertainty principles is an important field within harmonic analysis, qua...
Abstract—In applications such as social, energy, transporta-tion, sensor, and neuronal networks, hig...
International audienceSignal processing on graphs is a recent research domain that aims at generaliz...
International audienceGraph Signal Processing (GSP) is a mathematical framework that aims at extendi...
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...
In many applications of current interest, the observations are represented as a signal defined over ...
This paper advances a new way to formulate the uncertainty principle for graphs, by using a non-loca...
We present a flexible framework for uncertainty principles in spectral graph theory. In this framewo...
In this paper we address the problem of analyzing signals defined over graphs whose topology is know...
International audienceThe uncertainty principle states that a signal cannot be localized both in tim...
The subject of analytical uncertainty principles is an important field within harmonic analysis, qua...
Modern datasets are often massive due to the sharp decrease in the cost of collecting and storing da...
International audienceWe study properties of the family of small-world random graphs introduced in W...
This thesis addresses statistical estimation and testing of signals over a graph when measurements a...
The subject of analytical uncertainty principles is an important field within harmonic analysis, qua...
Abstract—In applications such as social, energy, transporta-tion, sensor, and neuronal networks, hig...
International audienceSignal processing on graphs is a recent research domain that aims at generaliz...
International audienceGraph Signal Processing (GSP) is a mathematical framework that aims at extendi...
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...
In many applications of current interest, the observations are represented as a signal defined over ...
This paper advances a new way to formulate the uncertainty principle for graphs, by using a non-loca...
We present a flexible framework for uncertainty principles in spectral graph theory. In this framewo...
In this paper we address the problem of analyzing signals defined over graphs whose topology is know...
International audienceThe uncertainty principle states that a signal cannot be localized both in tim...
The subject of analytical uncertainty principles is an important field within harmonic analysis, qua...
Modern datasets are often massive due to the sharp decrease in the cost of collecting and storing da...
International audienceWe study properties of the family of small-world random graphs introduced in W...
This thesis addresses statistical estimation and testing of signals over a graph when measurements a...
The subject of analytical uncertainty principles is an important field within harmonic analysis, qua...
Abstract—In applications such as social, energy, transporta-tion, sensor, and neuronal networks, hig...