Correlation matrices are standardized covariance matrices. They form an affine space of symmetric matrices defined by setting the diagonal entries to one. We study the geometry of maximum likelihood estimation for this model and linear submodels that encode additional symmetries. We also consider the problem of minimizing two closely related functions of the covariance matrix: the Stein's loss and the symmetrized Stein's loss. Unlike the Gaussian log-likelihood these two functions are convex and hence admit a unique positive definite optimum. Some of our results hold for general affine covariance models
We consider the problem of estimating high-dimensional covariance matrices of K-populations or class...
AbstractThe need to estimate structured covariance matrices arises in a variety of applications and ...
We study parameter estimation in linear Gaussian covariance models, which are p-dimensional Gaussian...
We study multivariate Gaussian models that are described by linear conditions on the concentration m...
In this paper, we analyse the computational advantages of the spherical parametrisation for correlat...
We study the maximum likelihood degree of linear concentration models in algebraic statistics. We re...
We study parameter estimation in linear Gaussian covariance models, which are p-dimensional Gaussian...
The covariance structure of spatial Gaussian predictors (aka Kriging predictors) is generally model...
We study the problem of maximum likelihood estimation for 3-dimensional linear spaces of 3 x 3 symme...
Aims.The maximum-likelihood method is the standard approach to obtain model fits to observational da...
The closed-form maximum likelihood estimators for the completely balanced multivariate one-way rando...
We introduce a distributionally robust maximum likelihood estimation model with a Wasserstein ambigu...
This article presents maximum likelihood estimators (MLEs) and log-likelihood ratio (LLR) tests for ...
This dissertation is motivated by addressing the statistical analysis of symmetric positive definite...
The need to estimate structured covariance matrices arises in a variety of applications and the prob...
We consider the problem of estimating high-dimensional covariance matrices of K-populations or class...
AbstractThe need to estimate structured covariance matrices arises in a variety of applications and ...
We study parameter estimation in linear Gaussian covariance models, which are p-dimensional Gaussian...
We study multivariate Gaussian models that are described by linear conditions on the concentration m...
In this paper, we analyse the computational advantages of the spherical parametrisation for correlat...
We study the maximum likelihood degree of linear concentration models in algebraic statistics. We re...
We study parameter estimation in linear Gaussian covariance models, which are p-dimensional Gaussian...
The covariance structure of spatial Gaussian predictors (aka Kriging predictors) is generally model...
We study the problem of maximum likelihood estimation for 3-dimensional linear spaces of 3 x 3 symme...
Aims.The maximum-likelihood method is the standard approach to obtain model fits to observational da...
The closed-form maximum likelihood estimators for the completely balanced multivariate one-way rando...
We introduce a distributionally robust maximum likelihood estimation model with a Wasserstein ambigu...
This article presents maximum likelihood estimators (MLEs) and log-likelihood ratio (LLR) tests for ...
This dissertation is motivated by addressing the statistical analysis of symmetric positive definite...
The need to estimate structured covariance matrices arises in a variety of applications and the prob...
We consider the problem of estimating high-dimensional covariance matrices of K-populations or class...
AbstractThe need to estimate structured covariance matrices arises in a variety of applications and ...
We study parameter estimation in linear Gaussian covariance models, which are p-dimensional Gaussian...