Minimization of the ` ∞ (or maximum) norm subject to a constraint that imposes consistency to an underdetermined system of linear equations finds use in a large number of practical applications, including vector quantization, peak-to-average power ratio (PAPR) (or “crest factor”) reduction in communication systems, approximate nearest neighbor search, and peak force minimization in robotics and control. This paper analyzes the fundamental properties of signal representations obtained by solving such a convex optimization problem. We develop bounds on the maximum magnitude of such representations using the uncertainty principle (UP) introduced by Lyubarskii and Vershynin, IEEE Trans. IT, 2010, and study the efficacy of `∞-norm-based PAPR red...
With the ever-growing data sizes along with the increasing complexity of the modern problem formulat...
This dissertation studies the applicability of convex optimization to the formal verification and sy...
The authors propose a framework that takes explicitly into account both time-domain constraints and ...
Minimization of the `1 (or maximum) norm subject to a constraint that imposes consistency to an unde...
Abstract—Maximum (or `∞) norm minimization subject to an underdetermined system of linear equations ...
Maximum (or L_infinity) norm minimization subject to an underdetermined system of linear equations f...
Many problems in signal processing and statistical inference are based on finding a sparse solution ...
The affine rank minimization problem consists of finding a matrix of minimum rank that satisfies a g...
In this tutorial paper, we consider the problem of minimizing the rank of a matrix over a convex set...
This paper addresses the problem of model reduction for uncertain discrete-time systems with convex ...
Abstract This paper presents the computation of the non‐parametric uncertainty model for multi input...
Abstract—We introduce two new methods for the demodulation of acoustic signals by posing the problem...
This thesis is focused on the limits of performance of large-scale convex optimization algorithms. C...
We propose a framework for robust modeling of linear programming problems using uncertainty sets des...
In applications throughout science and engineering one is often faced with the challenge of solving ...
With the ever-growing data sizes along with the increasing complexity of the modern problem formulat...
This dissertation studies the applicability of convex optimization to the formal verification and sy...
The authors propose a framework that takes explicitly into account both time-domain constraints and ...
Minimization of the `1 (or maximum) norm subject to a constraint that imposes consistency to an unde...
Abstract—Maximum (or `∞) norm minimization subject to an underdetermined system of linear equations ...
Maximum (or L_infinity) norm minimization subject to an underdetermined system of linear equations f...
Many problems in signal processing and statistical inference are based on finding a sparse solution ...
The affine rank minimization problem consists of finding a matrix of minimum rank that satisfies a g...
In this tutorial paper, we consider the problem of minimizing the rank of a matrix over a convex set...
This paper addresses the problem of model reduction for uncertain discrete-time systems with convex ...
Abstract This paper presents the computation of the non‐parametric uncertainty model for multi input...
Abstract—We introduce two new methods for the demodulation of acoustic signals by posing the problem...
This thesis is focused on the limits of performance of large-scale convex optimization algorithms. C...
We propose a framework for robust modeling of linear programming problems using uncertainty sets des...
In applications throughout science and engineering one is often faced with the challenge of solving ...
With the ever-growing data sizes along with the increasing complexity of the modern problem formulat...
This dissertation studies the applicability of convex optimization to the formal verification and sy...
The authors propose a framework that takes explicitly into account both time-domain constraints and ...