Many applications have benefited remarkably from low-dimensional models in the recent decade. The fact that many signals, though high dimensional, are intrinsically low dimensional has given the possibility to recover them stably from a relatively small number of their measurements. For example, in compressed sensing with the standard (synthesis) sparsity prior and in matrix completion, the number of measurements needed is proportional (up to a logarithmic factor) to the signal's manifold dimension. Recently, a new natural low-dimensional signal model has been proposed: the cosparse analysis prior. In the noiseless case, it is possible to recover signals from this model, using a combinatorial search, from a number of measurements proporti...
We give explicit theoretical and heuristical bounds for how big does a data set sampled from a reach...
Conference PaperRandom projections have recently found a surprising niche in signal processing. The ...
The nascent field of compressed sensing is founded on the fact that high-dimensional signals with “s...
Abstract—Many applications have benefited remarkably from low-dimensional models in the recent decad...
Models in signal processing often deal with some notion of structure or conciseness suggesting that ...
Journal PaperMany types of data and information can be described by concise models that suggest each...
The last decade witnessed the burgeoning development in the reconstruction of signals by exploiting ...
This paper investigates the problem of stable signal estimation from undersampled, noisy sub-Gaussia...
We compare and contrast from a geometric perspective a number of low-dimensional signal models that ...
We give a new, very general, formulation of the compressed sensing problem in terms of coordinate pr...
International audienceIn the past decade there has been a great interest in a synthesis-based model ...
We propose a novel method for linear dimensionality reduction of manifold modeled data. First, we sh...
The object of this thesis is the study of constrained measurement systems of signals having low-dime...
dissertationIntrinsic dimension estimation is a fundamental problem in manifold learning. In applica...
International audienceIn many linear inverse problems, we want to estimate an unknown vector belongi...
We give explicit theoretical and heuristical bounds for how big does a data set sampled from a reach...
Conference PaperRandom projections have recently found a surprising niche in signal processing. The ...
The nascent field of compressed sensing is founded on the fact that high-dimensional signals with “s...
Abstract—Many applications have benefited remarkably from low-dimensional models in the recent decad...
Models in signal processing often deal with some notion of structure or conciseness suggesting that ...
Journal PaperMany types of data and information can be described by concise models that suggest each...
The last decade witnessed the burgeoning development in the reconstruction of signals by exploiting ...
This paper investigates the problem of stable signal estimation from undersampled, noisy sub-Gaussia...
We compare and contrast from a geometric perspective a number of low-dimensional signal models that ...
We give a new, very general, formulation of the compressed sensing problem in terms of coordinate pr...
International audienceIn the past decade there has been a great interest in a synthesis-based model ...
We propose a novel method for linear dimensionality reduction of manifold modeled data. First, we sh...
The object of this thesis is the study of constrained measurement systems of signals having low-dime...
dissertationIntrinsic dimension estimation is a fundamental problem in manifold learning. In applica...
International audienceIn many linear inverse problems, we want to estimate an unknown vector belongi...
We give explicit theoretical and heuristical bounds for how big does a data set sampled from a reach...
Conference PaperRandom projections have recently found a surprising niche in signal processing. The ...
The nascent field of compressed sensing is founded on the fact that high-dimensional signals with “s...