The lasso is a popular tool for sparse linear regression, especially for problems in which the number of variables p exceeds the number of observations n. But when p > n, the lasso criterion is not strictly convex, and hence it may not have a unique minimum. An important question is: when is the lasso solution well-defined (unique)? We review results from the literature, which show that if the predictor variables are drawn from a continuous probability distribution, then there is a unique lasso solution with probability one, regardless of the sizes of n and p. We also show that this result extends easily to ℓ1 penalized minimization problems over a wide range of loss functions. A second important question is: how can we manage the case of n...
The Lasso is an attractive regularisation method for high-dimensional regression. It combines variab...
We study the effective degrees of freedom of the lasso in the framework of Stein’s unbiased risk est...
We consider the least-square linear regression problem with regularization by the $\ell^1$-norm, a p...
In this note we show that, if β₁ and β₂ are two distinct solutions to the lasso problem minβ∈Rp∥ y -...
In this paper, we investigate the degrees of freedom ($\dof$) of penalized $\ell_1$ minimization (al...
In this paper, we investigate the degrees of freedom (df) of penalized l1 minimization (also known a...
This paper shows that the solutions to various convex l1 minimization problems are unique if and onl...
We provide a necessary and sufficient condition for the uniqueness of penalized least-squares estima...
International audienceDuring the talk we will give a necessary and sufficient condition for the uniq...
We study the degrees of freedom of the Lasso in the framework of Stein's unbiased risk estimati...
Lasso is an optimization problem that is favored by both statisticians and data scientists, and algo...
The Lasso is an attractive technique for regularization and variable selection for high-dimensional ...
We consider a linear regression problem in a high dimensional setting where the number of covariates...
We present upper and lower bounds for the prediction error of the Lasso. For the case of random Gaus...
This thesis consists of three parts. In Chapter 1, we examine existing variable selection methods an...
The Lasso is an attractive regularisation method for high-dimensional regression. It combines variab...
We study the effective degrees of freedom of the lasso in the framework of Stein’s unbiased risk est...
We consider the least-square linear regression problem with regularization by the $\ell^1$-norm, a p...
In this note we show that, if β₁ and β₂ are two distinct solutions to the lasso problem minβ∈Rp∥ y -...
In this paper, we investigate the degrees of freedom ($\dof$) of penalized $\ell_1$ minimization (al...
In this paper, we investigate the degrees of freedom (df) of penalized l1 minimization (also known a...
This paper shows that the solutions to various convex l1 minimization problems are unique if and onl...
We provide a necessary and sufficient condition for the uniqueness of penalized least-squares estima...
International audienceDuring the talk we will give a necessary and sufficient condition for the uniq...
We study the degrees of freedom of the Lasso in the framework of Stein's unbiased risk estimati...
Lasso is an optimization problem that is favored by both statisticians and data scientists, and algo...
The Lasso is an attractive technique for regularization and variable selection for high-dimensional ...
We consider a linear regression problem in a high dimensional setting where the number of covariates...
We present upper and lower bounds for the prediction error of the Lasso. For the case of random Gaus...
This thesis consists of three parts. In Chapter 1, we examine existing variable selection methods an...
The Lasso is an attractive regularisation method for high-dimensional regression. It combines variab...
We study the effective degrees of freedom of the lasso in the framework of Stein’s unbiased risk est...
We consider the least-square linear regression problem with regularization by the $\ell^1$-norm, a p...