Abstract—In this paper, motivated by network inference and tomography applications, we study the problem of compressive sensing for sparse signal vectors over graphs. In particular, we are interested in recovering sparse vectors representing the properties of the edges from a graph. Unlike existing compressive sensing results, the collective additive measurements we are allowed to take must follow connected paths over the underlying graph. For a sufficiently connected graph with n nodes, it is shown that, using O(k log(n)) path measurements, we are able to recover any k-sparse link vector (with no more than k nonzero elements), even though the measurements have to follow the graph path constraints. We mainly show that the computationally ef...
The problem of identifying sparse solutions for the link structure and dynamics of an unknown linear...
In this paper, we analyze the information theoretic lower bound on the necessary number of samples n...
We address the problem of robustly recovering the support of high-dimensional sparse signals1 from l...
This paper addresses the problem of recovering sparse link vectors with network topological constrai...
Abstract—In this paper, we propose a novel framework called UCS-WN in the context of compressive sen...
Abstract — Sparse recovery can recover sparse signals from a set of underdetermined linear measureme...
Sparse recovery can recover sparse signals from a set of underdetermined linear measurements. Motiva...
Sparse recovery explores the sparsity structure inside data and aims to find a low-dimensional repre...
Abstract—This paper addresses the problem of sparse recovery with graph constraints in the sense tha...
The problem of identifying sparse solutions for the link structure and dynamics of an unknown linear...
Abstract—Compressive sensing is an emerging technol-ogy which can recover a sparse signal vector of ...
Abstract—Expander graphs have been recently proposed to construct efficient compressed sensing algor...
Abstract—We consider the recovery of a nonnegative vector x from measurements y = Ax, where A ∈ {0, ...
Compressive sensing is an emerging technology which can recover a sparse signal vector of dimension ...
We consider the recovery of a nonnegative vector x from measurements y = Ax, where A ∈ {0, 1}[supers...
The problem of identifying sparse solutions for the link structure and dynamics of an unknown linear...
In this paper, we analyze the information theoretic lower bound on the necessary number of samples n...
We address the problem of robustly recovering the support of high-dimensional sparse signals1 from l...
This paper addresses the problem of recovering sparse link vectors with network topological constrai...
Abstract—In this paper, we propose a novel framework called UCS-WN in the context of compressive sen...
Abstract — Sparse recovery can recover sparse signals from a set of underdetermined linear measureme...
Sparse recovery can recover sparse signals from a set of underdetermined linear measurements. Motiva...
Sparse recovery explores the sparsity structure inside data and aims to find a low-dimensional repre...
Abstract—This paper addresses the problem of sparse recovery with graph constraints in the sense tha...
The problem of identifying sparse solutions for the link structure and dynamics of an unknown linear...
Abstract—Compressive sensing is an emerging technol-ogy which can recover a sparse signal vector of ...
Abstract—Expander graphs have been recently proposed to construct efficient compressed sensing algor...
Abstract—We consider the recovery of a nonnegative vector x from measurements y = Ax, where A ∈ {0, ...
Compressive sensing is an emerging technology which can recover a sparse signal vector of dimension ...
We consider the recovery of a nonnegative vector x from measurements y = Ax, where A ∈ {0, 1}[supers...
The problem of identifying sparse solutions for the link structure and dynamics of an unknown linear...
In this paper, we analyze the information theoretic lower bound on the necessary number of samples n...
We address the problem of robustly recovering the support of high-dimensional sparse signals1 from l...