Abstract—We consider the problem of estimating an input signal from noisy measurements in both parallel scalar Gaussian channels and linear mixing systems. The performance of the estimation process is quantified by the `∞-norm error metric (worst case error). Our previous results have shown for indepen-dent and identically distributed (i.i.d.) Gaussian mixture input signals that, when the input signal dimension goes to infinity, the Wiener filter minimizes the `∞-norm error. However, the input signal dimension is finite in practice. In this paper, we estimate the finite dimensional input signal by minimizing the mean `p-norm error. Numerical results show that the `p-norm minimizer outperforms the Wiener filter, provided that the value of p ...
We study the problem of estimating the largest gain of an unknown linear and time-invariant filter, ...
A popular approach for estimating an unknown signal x_0 ∈ ℝ^n from noisy, linear measurements y = Ax...
Abstract—Maximum (or `∞) norm minimization subject to an underdetermined system of linear equations ...
We consider the problem of estimating an input signal from noisy measurements in both parallel scala...
Abstract — Consider the estimation of a signal x ∈ RN from noisy observations r = x + z, where the i...
Abstract—We consider the problem of reconstructing a sig-nal from noisy measurements in linear mixin...
Abstract—This paper determines to within a single mea-surement the minimum number of measurements re...
We study the problem of filtering a Gaussian process whose trajectories, in some sense, have an unkn...
The standard H/sub 2/ optimal filtering problem considers the estimation of a certain output based o...
Maximum (or L_infinity) norm minimization subject to an underdetermined system of linear equations f...
The standard $H_2$ optimal filtering problem considers the estimation of a certain output based on t...
In this paper, we study the joint design of optimal linear encoders and decoders for filtering and t...
A popular approach for estimating an unknown signal x0 ∈ Rn from noisy, linear measurements y = Ax0 ...
Abstract—This work studies the properties of the minimum mean-square error (MMSE) of estimating an a...
Consider the minimum mean-square error (MMSE) of estimating an arbitrary random variable from its ob...
We study the problem of estimating the largest gain of an unknown linear and time-invariant filter, ...
A popular approach for estimating an unknown signal x_0 ∈ ℝ^n from noisy, linear measurements y = Ax...
Abstract—Maximum (or `∞) norm minimization subject to an underdetermined system of linear equations ...
We consider the problem of estimating an input signal from noisy measurements in both parallel scala...
Abstract — Consider the estimation of a signal x ∈ RN from noisy observations r = x + z, where the i...
Abstract—We consider the problem of reconstructing a sig-nal from noisy measurements in linear mixin...
Abstract—This paper determines to within a single mea-surement the minimum number of measurements re...
We study the problem of filtering a Gaussian process whose trajectories, in some sense, have an unkn...
The standard H/sub 2/ optimal filtering problem considers the estimation of a certain output based o...
Maximum (or L_infinity) norm minimization subject to an underdetermined system of linear equations f...
The standard $H_2$ optimal filtering problem considers the estimation of a certain output based on t...
In this paper, we study the joint design of optimal linear encoders and decoders for filtering and t...
A popular approach for estimating an unknown signal x0 ∈ Rn from noisy, linear measurements y = Ax0 ...
Abstract—This work studies the properties of the minimum mean-square error (MMSE) of estimating an a...
Consider the minimum mean-square error (MMSE) of estimating an arbitrary random variable from its ob...
We study the problem of estimating the largest gain of an unknown linear and time-invariant filter, ...
A popular approach for estimating an unknown signal x_0 ∈ ℝ^n from noisy, linear measurements y = Ax...
Abstract—Maximum (or `∞) norm minimization subject to an underdetermined system of linear equations ...