In this paper, we consider the Group Lasso estimator of the covariance matrix of a stochastic process corrupted by an additive noise. We propose to estimate the covariance matrix in a high-dimensional setting under the assumption that the process has a sparse representation in a large dictionary of basis functions. Using a matrix regression model, we propose a new methodology for high-dimensional covariance matrix estimation based on empirical contrast regularization by a group Lasso penalty. Using such a penalty, the method selects a sparse set of basis functions in the dictionary used to approximate the process, leading to an approximation of the covariance matrix into a low dimensional space. Consistency of the estimator is studied in Fr...
In this paper we develop inference for high dimensional linear models, with serially correlated erro...
In this work, we present a novel formulation for efficient estimation of group-sparse regression pro...
High-dimensional statistics is one of the most active research topics in modern statistics. It also ...
In this paper, we consider the Group Lasso estimator of the covariance matrix of a stochastic proces...
In this paper, we consider the Group Lasso estimator of the covariance matrix of a stochastic proces...
Nowadays an increasing amount of data is available and we have to deal with models in high dimension...
In this article, we focus on the estimation of a high-dimensional inverse covariance (i.e., precisio...
This thesis develops methodology and asymptotic analysis for sparse estimators of the covariance mat...
High-dimensional datasets, where the number of measured variables is larger than the sample size, ar...
This thesis deals with three problems. The first two of the problems are related in that they are co...
We study a group lasso estimator for the multivariate linear regression model that accounts for corr...
We consider high-dimensional estimation of a (possibly sparse) Kronecker-decomposable covariance mat...
Estimation of sparse covariance matrices and their inverse subject to positive definiteness constrai...
We present a Group Lasso procedure for generalized linear models (GLMs) and we study the properties ...
In this paper, we discuss a parsimonious approach to estimation of high-dimensional covariance matri...
In this paper we develop inference for high dimensional linear models, with serially correlated erro...
In this work, we present a novel formulation for efficient estimation of group-sparse regression pro...
High-dimensional statistics is one of the most active research topics in modern statistics. It also ...
In this paper, we consider the Group Lasso estimator of the covariance matrix of a stochastic proces...
In this paper, we consider the Group Lasso estimator of the covariance matrix of a stochastic proces...
Nowadays an increasing amount of data is available and we have to deal with models in high dimension...
In this article, we focus on the estimation of a high-dimensional inverse covariance (i.e., precisio...
This thesis develops methodology and asymptotic analysis for sparse estimators of the covariance mat...
High-dimensional datasets, where the number of measured variables is larger than the sample size, ar...
This thesis deals with three problems. The first two of the problems are related in that they are co...
We study a group lasso estimator for the multivariate linear regression model that accounts for corr...
We consider high-dimensional estimation of a (possibly sparse) Kronecker-decomposable covariance mat...
Estimation of sparse covariance matrices and their inverse subject to positive definiteness constrai...
We present a Group Lasso procedure for generalized linear models (GLMs) and we study the properties ...
In this paper, we discuss a parsimonious approach to estimation of high-dimensional covariance matri...
In this paper we develop inference for high dimensional linear models, with serially correlated erro...
In this work, we present a novel formulation for efficient estimation of group-sparse regression pro...
High-dimensional statistics is one of the most active research topics in modern statistics. It also ...