Maximum (or L_infinity) norm minimization subject to an underdetermined system of linear equations finds use in a large number of practical applications, such as vector quantization, peak-to-average power ratio (PAPR) (or "crest factor") reduction in wireless communication systems, approximate neighbor search, robotics, and control. In this paper, we analyze the fundamental properties of signal representations with minimum L_infinity-norm. In particular, we develop bounds on the maximum magnitude of such representations using the uncertainty principle (UP) introduced by Lyubarskii and Vershynin, 2010, and we characterize the limits of l_infinity-norm-based PAPR reduction. Our results show that matrices satisfying the UP, such as randomly su...
Abstract—We consider the problem of estimating an input signal from noisy measurements in both paral...
Abstract—We describe ways to define and calculate-norm signal subspaces that are less sensitive to o...
It is known that signals (which could be functions of space or time) belonging to L2-space cannot be...
Abstract—Maximum (or `∞) norm minimization subject to an underdetermined system of linear equations ...
Minimization of the ` ∞ (or maximum) norm subject to a constraint that imposes consistency to an und...
Minimization of the `1 (or maximum) norm subject to a constraint that imposes consistency to an unde...
A fast algorithm for the computation of the optimally frequencydependent scaled H1-norm of a finite ...
The need for real-time computation of the Euclidean norm of a vector arises frequently in many signa...
For a linear time invariant system, the infinity-norm of the transfer function can be used as a meas...
We derive bounds on the parameters of systems represented by a transfer functions such that a system...
This paper is concerned with the problem of robust peak-to-peak gain minimization (the L-1 or L-infi...
Most of the objective (cost) functions in op-timization techniques utilize norms especially when dea...
Abstract—Recently, the worse-case analysis, probabilistic anal-ysis and empirical justification have...
Approximation of digital signals by means of continuous-time functions is often required in many tas...
ℓ⁰ Norm based signal recovery is attractive in compressed sensing as it can facilitate exact recover...
Abstract—We consider the problem of estimating an input signal from noisy measurements in both paral...
Abstract—We describe ways to define and calculate-norm signal subspaces that are less sensitive to o...
It is known that signals (which could be functions of space or time) belonging to L2-space cannot be...
Abstract—Maximum (or `∞) norm minimization subject to an underdetermined system of linear equations ...
Minimization of the ` ∞ (or maximum) norm subject to a constraint that imposes consistency to an und...
Minimization of the `1 (or maximum) norm subject to a constraint that imposes consistency to an unde...
A fast algorithm for the computation of the optimally frequencydependent scaled H1-norm of a finite ...
The need for real-time computation of the Euclidean norm of a vector arises frequently in many signa...
For a linear time invariant system, the infinity-norm of the transfer function can be used as a meas...
We derive bounds on the parameters of systems represented by a transfer functions such that a system...
This paper is concerned with the problem of robust peak-to-peak gain minimization (the L-1 or L-infi...
Most of the objective (cost) functions in op-timization techniques utilize norms especially when dea...
Abstract—Recently, the worse-case analysis, probabilistic anal-ysis and empirical justification have...
Approximation of digital signals by means of continuous-time functions is often required in many tas...
ℓ⁰ Norm based signal recovery is attractive in compressed sensing as it can facilitate exact recover...
Abstract—We consider the problem of estimating an input signal from noisy measurements in both paral...
Abstract—We describe ways to define and calculate-norm signal subspaces that are less sensitive to o...
It is known that signals (which could be functions of space or time) belonging to L2-space cannot be...