The LASSO regression has been studied extensively in the statistics and signal processing community, especially in the realm of sparse parameter estimation from linear measurements. We analyze the convergence rate of a first-order method applied on a smooth, strictly convex, and parametric upper bound on the LASSO objective function. The upper bound approaches the true non-smooth objective as the parameter tends to infinity. We show that a gradient-based algorithm, applied to minimize the smooth upper bound, yields a convergence rate of O (1/K), where K denotes the number of iterations performed. The analysis also reveals the optimum value of the parameter that achieves a desired prediction accuracy, provided that the total number of iterat...
The Lasso shrinkage procedure achieved its popularity, in part, by its tendency to shrink estimated ...
The LASSO sparse regression method has recently received attention in a variety of applications from...
The Lasso is an attractive technique for regularization and variable selection for high-dimensional ...
International audienceIn high dimensional settings, sparse structures are crucial for efficiency, bo...
The Lasso is an attractive regularisation method for high-dimensional regression. It combines variab...
International audienceIn high dimensional sparse regression, pivotal estimators are estimators for w...
This paper discusses estimation of regression model with LASSO penalty when the L1-norm is replaced ...
In optimization, it is known that when the objective functions are strictly convex and well-conditio...
Many statistical M-estimators are based on convex optimization problems formed by the weighted sum o...
The batch least-absolute shrinkage and selection operator (Lasso) has well-documented merits for est...
Since the advent of the l(1) regularized least squares method (LASSO), a new line of research has em...
This thesis studies the performance of the LASSO (also known as basis pursuit denoising) for recover...
A recent line of work has established accurate predictions of the mean squared-error (MSE) performan...
Many statistical M-estimators are based on convex optimization problems formed by the combination of...
This paper studies the optimal tuning of the regularization parameter in LASSO or the threshold para...
The Lasso shrinkage procedure achieved its popularity, in part, by its tendency to shrink estimated ...
The LASSO sparse regression method has recently received attention in a variety of applications from...
The Lasso is an attractive technique for regularization and variable selection for high-dimensional ...
International audienceIn high dimensional settings, sparse structures are crucial for efficiency, bo...
The Lasso is an attractive regularisation method for high-dimensional regression. It combines variab...
International audienceIn high dimensional sparse regression, pivotal estimators are estimators for w...
This paper discusses estimation of regression model with LASSO penalty when the L1-norm is replaced ...
In optimization, it is known that when the objective functions are strictly convex and well-conditio...
Many statistical M-estimators are based on convex optimization problems formed by the weighted sum o...
The batch least-absolute shrinkage and selection operator (Lasso) has well-documented merits for est...
Since the advent of the l(1) regularized least squares method (LASSO), a new line of research has em...
This thesis studies the performance of the LASSO (also known as basis pursuit denoising) for recover...
A recent line of work has established accurate predictions of the mean squared-error (MSE) performan...
Many statistical M-estimators are based on convex optimization problems formed by the combination of...
This paper studies the optimal tuning of the regularization parameter in LASSO or the threshold para...
The Lasso shrinkage procedure achieved its popularity, in part, by its tendency to shrink estimated ...
The LASSO sparse regression method has recently received attention in a variety of applications from...
The Lasso is an attractive technique for regularization and variable selection for high-dimensional ...