The need to estimate structured covariance matrices arises in a variety of applications and the problem is widely studied in statistics. A new method is proposed for regularizing the covariance structure of a given covariance matrix whose underlying structure has been blurred by random noise, particularly when the dimension of the covariance matrix is high. The regularization is made by choosing an optimal structure from an available class of covariance structures in terms of minimizing the discrepancy, defined via the entropy loss function, between the given matrix and the class. A range of potential candidate structures comprising tridiagonal Toeplitz, compound symmetry, AR(1), and banded Toeplitz is considered. It is shown that for the f...
In this paper, we consider the Group Lasso estimator of the covariance matrix of a stochastic proces...
We consider robust covariance estimation with an emphasis on Tyler\u27s M-estimator. This method pro...
In this paper we consider two different linear covariance structures, e.g., banded and bended Toepli...
The need to estimate structured covariance matrices arises in a variety of applications and the prob...
AbstractThe need to estimate structured covariance matrices arises in a variety of applications and ...
summary:The aim of the paper is to present a procedure for the approximation of a symmetric positive...
The paper considers the problem of estimating the covariance matrices of multiple classes in a low s...
An approach of regularizing Tyler\u27s robust M-estimator of the co-variance matrix is proposed. We ...
There is a one to one mapping between a p dimensional strictly positive definite covariance matrix Σ...
Statistical models that possess symmetry arise in diverse settings such as ran-dom fields associated...
This paper proposes a diagonal covariance matrix approximation for Wide-Sense Stationary (WSS) signa...
Covariance matrix estimation plays an important role in statistical analysis in many fields, includi...
Covariance matrices usually exhibit specific spectral structures, such as low-rank ones in the case ...
Abstract—In many practical situations we would like to es-timate the covariance matrix of a set of v...
This paper tackles the problem of estimating the covariance matrix in large-dimension and small-samp...
In this paper, we consider the Group Lasso estimator of the covariance matrix of a stochastic proces...
We consider robust covariance estimation with an emphasis on Tyler\u27s M-estimator. This method pro...
In this paper we consider two different linear covariance structures, e.g., banded and bended Toepli...
The need to estimate structured covariance matrices arises in a variety of applications and the prob...
AbstractThe need to estimate structured covariance matrices arises in a variety of applications and ...
summary:The aim of the paper is to present a procedure for the approximation of a symmetric positive...
The paper considers the problem of estimating the covariance matrices of multiple classes in a low s...
An approach of regularizing Tyler\u27s robust M-estimator of the co-variance matrix is proposed. We ...
There is a one to one mapping between a p dimensional strictly positive definite covariance matrix Σ...
Statistical models that possess symmetry arise in diverse settings such as ran-dom fields associated...
This paper proposes a diagonal covariance matrix approximation for Wide-Sense Stationary (WSS) signa...
Covariance matrix estimation plays an important role in statistical analysis in many fields, includi...
Covariance matrices usually exhibit specific spectral structures, such as low-rank ones in the case ...
Abstract—In many practical situations we would like to es-timate the covariance matrix of a set of v...
This paper tackles the problem of estimating the covariance matrix in large-dimension and small-samp...
In this paper, we consider the Group Lasso estimator of the covariance matrix of a stochastic proces...
We consider robust covariance estimation with an emphasis on Tyler\u27s M-estimator. This method pro...
In this paper we consider two different linear covariance structures, e.g., banded and bended Toepli...