Add to ORKGIn this work we construct an optimal shrinkage estimator for the precision matrix in high dimensions. We consider the general asymptotics when the number of variables p → ∞ and the sample size n → ∞ so that p/n → c ∈ (0,+∞). The precision matrix is estimated directly, without inverting the corresponding estimator for the covariance matrix. The recent results from the random matrix theory allow us to find the asymp-totic deterministic equivalents of the optimal shrinkage intensities and estimate them consistently. The resulting distribution-free estimator has almost surely the minimum Frobenius loss. Additionally, we prove that the Frobenius norms of the inverse and of the pseudo-inverse sample covariance matrices tend almost surely to det...
We consider the problem of estimating a low-rank signal matrix from noisy measurements under the ass...
Recently, the shrinkage approach has increased its popularity in theoretical and applied statistics,...
This master thesis refers to the determination of certain choice criteria for minimaxes and admiss...
International audienceRobust high dimensional covariance estimators are considered, comprising regul...
This paper constructs a new estimator for large covariance matrices by drawing a bridge between the ...
This paper introduces a new method for deriving covariance matrix estimators that are decision-theor...
Under rotation-equivariant decision theory, sample covariance matrix eigenvalues can be optimally sh...
This book provides a self-contained introduction to shrinkage estimation for matrix-variate normal d...
When estimating covariance matrices, traditional sample covariance-based estimators are straightforw...
This article studies two regularized robust estimators of scatter matrices proposed (and proved to b...
We introduce nonparametric regularization of the eigenvalues of a sample covariance matrix through s...
Estimating a covariance matrix is an important task in applications where the number of vari-ables i...
This paper establishes the first analytical formula for optimal nonlinear shrinkage of large-dimensi...
Many statistical applications require an estimate of a covariance matrix and/or its inverse. When th...
Estimating the covariance matrix of a random vector is essential and challenging in large dimension ...
We consider the problem of estimating a low-rank signal matrix from noisy measurements under the ass...
Recently, the shrinkage approach has increased its popularity in theoretical and applied statistics,...
This master thesis refers to the determination of certain choice criteria for minimaxes and admiss...
International audienceRobust high dimensional covariance estimators are considered, comprising regul...
This paper constructs a new estimator for large covariance matrices by drawing a bridge between the ...
This paper introduces a new method for deriving covariance matrix estimators that are decision-theor...
Under rotation-equivariant decision theory, sample covariance matrix eigenvalues can be optimally sh...
This book provides a self-contained introduction to shrinkage estimation for matrix-variate normal d...
When estimating covariance matrices, traditional sample covariance-based estimators are straightforw...
This article studies two regularized robust estimators of scatter matrices proposed (and proved to b...
We introduce nonparametric regularization of the eigenvalues of a sample covariance matrix through s...
Estimating a covariance matrix is an important task in applications where the number of vari-ables i...
This paper establishes the first analytical formula for optimal nonlinear shrinkage of large-dimensi...
Many statistical applications require an estimate of a covariance matrix and/or its inverse. When th...
Estimating the covariance matrix of a random vector is essential and challenging in large dimension ...
We consider the problem of estimating a low-rank signal matrix from noisy measurements under the ass...
Recently, the shrinkage approach has increased its popularity in theoretical and applied statistics,...
This master thesis refers to the determination of certain choice criteria for minimaxes and admiss...