The 1 norm regularized least square technique has been proposed as an efficient method to calculate sparse solutions. However, the choice of the regularization parameter is still an unsolved problem, especially when the number of nonzero elements is unknown. In this paper we first design different ML estimators by interpreting the 1 norm regularization as a MAP estimator with a Laplacian model for data. We also utilize the MDL criterion to decide on the regularization parameter. The performance of these new methods are evaluated in the context of estimating the Directions Of Arrival (DOA) for the simulated data and compared. The simulations show that the performance of the different forms of the MAP estimator are approximately equal in the ...
Nonquadratic regularizers, in particular the l/sub 1/ norm regularizer can yield sparse solutions th...
We study the problem of recovering a sparse vector from a set of linear measure-ments. This problem ...
Non-quadratic regularizers, in particular the ℓ1 norm regularizer can yield sparse solutions that ge...
The l(1) norm regularized least square technique has been proposed as an efficient method to calcula...
International audienceThis article deals with the selection of the regularization parameter of a spa...
We intrduce a new algorithm for 1L regularized generalized linear models. The 1L regularization proc...
The lasso algorithm for variable selection in linear models, intro- duced by Tibshirani, works by im...
Since the advent of the l(1) regularized least squares method (LASSO), a new line of research has em...
In this paper, we propose a new direction of arrival (DOA) estimation algorithm, in which DOA estima...
We adopt a maximum a posteriori (MAP) estimation based approach for recovering sparse signals from a...
The lasso algorithm for variable selection in linear models, introduced by Tibshirani, works by impo...
The idea of representing a signal in a classical computing machine has played a central role in the ...
In many practical situations, it is highly desirable to estimate an accurate mathematical model of a...
Non-quadratic regularizers, in particular the l1 norm regularizer can yield sparse solutions that ge...
<p>We consider a Bayesian framework for estimating a high-dimensional sparse precision matrix, in wh...
Nonquadratic regularizers, in particular the l/sub 1/ norm regularizer can yield sparse solutions th...
We study the problem of recovering a sparse vector from a set of linear measure-ments. This problem ...
Non-quadratic regularizers, in particular the ℓ1 norm regularizer can yield sparse solutions that ge...
The l(1) norm regularized least square technique has been proposed as an efficient method to calcula...
International audienceThis article deals with the selection of the regularization parameter of a spa...
We intrduce a new algorithm for 1L regularized generalized linear models. The 1L regularization proc...
The lasso algorithm for variable selection in linear models, intro- duced by Tibshirani, works by im...
Since the advent of the l(1) regularized least squares method (LASSO), a new line of research has em...
In this paper, we propose a new direction of arrival (DOA) estimation algorithm, in which DOA estima...
We adopt a maximum a posteriori (MAP) estimation based approach for recovering sparse signals from a...
The lasso algorithm for variable selection in linear models, introduced by Tibshirani, works by impo...
The idea of representing a signal in a classical computing machine has played a central role in the ...
In many practical situations, it is highly desirable to estimate an accurate mathematical model of a...
Non-quadratic regularizers, in particular the l1 norm regularizer can yield sparse solutions that ge...
<p>We consider a Bayesian framework for estimating a high-dimensional sparse precision matrix, in wh...
Nonquadratic regularizers, in particular the l/sub 1/ norm regularizer can yield sparse solutions th...
We study the problem of recovering a sparse vector from a set of linear measure-ments. This problem ...
Non-quadratic regularizers, in particular the ℓ1 norm regularizer can yield sparse solutions that ge...