This note considers the problem of blind identification of a linear, time-invariant (LTI) system when the input signals are unknown, but belong to sufficiently diverse, known subspaces. This problem can be recast as the recovery of a rank-1 matrix, and is effectively relaxed using a semidefinite program (SDP). We show that exact recovery of both the unknown impulse response, and the unknown inputs, occurs when the following conditions are met: (1) the impulse response function is spread in the Fourier domain, and (2) the N input vectors belong to generic, known subspaces of dimension K in ℝL. Recent results in the well-understood area of low-rank recovery from underdetermined linear measurements can be adapted to show that exact recovery oc...
A rank-constrained reformulation of the blind deconvolution problem on images taken with coherent il...
Blind linear system identification (or recovery) arises in several applications in engineering (e.g....
We prove new results about the robustness of well-known convex noise-blind optimization formulations...
We consider the problem of recovering two unknown vectors, w and x, of length L from their circular ...
In this paper we consider the classical problem of blind deconvolution of multiple signals from its ...
We consider simultaneous blind deconvolution of r source signals from their noisy superposition, a p...
Blind deconvolution is an ubiquitous non-linear inverse problem in applications like wireless commun...
Semi-blind deconvolution is the process of estimating the unknown input of a linear system, starting...
In this work we consider one-dimensional blind deconvolution with prior knowledge of signal autocorr...
Low-rank matrix recovery from structured measurements has been a topic of intense study in the last ...
Suppose that we have $r$ sensors and each one intends to send a function $z_i$ (e.g. a sign...
We study the question of reconstructing two signals $f$ and $g$ from their convolution $y =...
Recently the one-dimensional time-discrete blind deconvolution problem was shown to be solvable uniq...
We study the problem of identifying the parameters of a linear system from its response to multiple ...
International audienceWe investigate a compressive sensing system in which the sensors introduce a d...
A rank-constrained reformulation of the blind deconvolution problem on images taken with coherent il...
Blind linear system identification (or recovery) arises in several applications in engineering (e.g....
We prove new results about the robustness of well-known convex noise-blind optimization formulations...
We consider the problem of recovering two unknown vectors, w and x, of length L from their circular ...
In this paper we consider the classical problem of blind deconvolution of multiple signals from its ...
We consider simultaneous blind deconvolution of r source signals from their noisy superposition, a p...
Blind deconvolution is an ubiquitous non-linear inverse problem in applications like wireless commun...
Semi-blind deconvolution is the process of estimating the unknown input of a linear system, starting...
In this work we consider one-dimensional blind deconvolution with prior knowledge of signal autocorr...
Low-rank matrix recovery from structured measurements has been a topic of intense study in the last ...
Suppose that we have $r$ sensors and each one intends to send a function $z_i$ (e.g. a sign...
We study the question of reconstructing two signals $f$ and $g$ from their convolution $y =...
Recently the one-dimensional time-discrete blind deconvolution problem was shown to be solvable uniq...
We study the problem of identifying the parameters of a linear system from its response to multiple ...
International audienceWe investigate a compressive sensing system in which the sensors introduce a d...
A rank-constrained reformulation of the blind deconvolution problem on images taken with coherent il...
Blind linear system identification (or recovery) arises in several applications in engineering (e.g....
We prove new results about the robustness of well-known convex noise-blind optimization formulations...