Group-based sparsity models are proven instrumental in linear regression problems for recovering signals from much fewer measurements than standard compressive sensing. A promise of these models is to lead to “interpretable” signals for which we identify its constituent groups, however we show that, in general, claims of correctly identifying the groups with convex relaxations would lead to polynomial time solution algorithms for an NP-hard problem. Instead, leveraging a graph-based understanding of group models, we describe group structures which enable correct model identification in polynomial time via dynamic programming. We also show that group structures that lead to totally unimodular constraints have tractable relaxations. Finally, ...
We introduce a new sparse recovery paradigm, called Normed Pursuits, where efficient algorithms from...
This is the accepted version of the article. The final publication is available at link.springer.com...
The Restricted Isometry Property (RIP) is a fundamental property of a matrix enabling sparse recover...
In this paper, we study the problem of recovering a group sparse vector from a small number of linea...
We propose a new effective algorithm for recovering a group sparse signal from very limited observat...
Today, sparsity techniques have been widely used to address practical problems in the fields of medi...
International audienceThe paper deals with the problem of finding sparse solutions to systems of pol...
We consider the problem of sparse variable selection in nonparametric additive models, with the prio...
This paper deals with sparse phase retrieval, i.e., the problem of estimating a vector from quadrati...
Compressed sensing refers to the recovery of a high-dimensional but sparse vector using a small numb...
Recent results in Compressive Sensing have shown that, under certain conditions, the solution to an ...
We introduce a new signal model, called (K,C)-sparse, to capture K-sparse signals in N dimensions wh...
This doctorate thesis focuses on sparse regression, a statistical modeling tool for selecting valuab...
In the field of high-dimensional statistics, it is commonly assumed that only a small subset of the ...
This paper describes a simple framework for structured sparse recovery based on convex op-timization...
We introduce a new sparse recovery paradigm, called Normed Pursuits, where efficient algorithms from...
This is the accepted version of the article. The final publication is available at link.springer.com...
The Restricted Isometry Property (RIP) is a fundamental property of a matrix enabling sparse recover...
In this paper, we study the problem of recovering a group sparse vector from a small number of linea...
We propose a new effective algorithm for recovering a group sparse signal from very limited observat...
Today, sparsity techniques have been widely used to address practical problems in the fields of medi...
International audienceThe paper deals with the problem of finding sparse solutions to systems of pol...
We consider the problem of sparse variable selection in nonparametric additive models, with the prio...
This paper deals with sparse phase retrieval, i.e., the problem of estimating a vector from quadrati...
Compressed sensing refers to the recovery of a high-dimensional but sparse vector using a small numb...
Recent results in Compressive Sensing have shown that, under certain conditions, the solution to an ...
We introduce a new signal model, called (K,C)-sparse, to capture K-sparse signals in N dimensions wh...
This doctorate thesis focuses on sparse regression, a statistical modeling tool for selecting valuab...
In the field of high-dimensional statistics, it is commonly assumed that only a small subset of the ...
This paper describes a simple framework for structured sparse recovery based on convex op-timization...
We introduce a new sparse recovery paradigm, called Normed Pursuits, where efficient algorithms from...
This is the accepted version of the article. The final publication is available at link.springer.com...
The Restricted Isometry Property (RIP) is a fundamental property of a matrix enabling sparse recover...