Covariance estimation is a key step in many target detection algorithms. To distinguish target from background requires that the background be well-characterized. This applies to targets ranging from the precisely known chemical signatures of gaseous plumes to the wholly unspecified signals that are sought by anomaly detectors. When the background is modelled by a (global or local) Gaussian or other elliptically contoured distribution (such as Laplacian or multivariate-t), a covariance matrix must be estimated. The standard sample covariance overfits the data, and when the training sample size is small, the target detection performance suffers. Shrinkage addresses the problem of overfitting that inevitably arises when a high-dimensional mod...
Under rotation-equivariant decision theory, sample covariance matrix eigenvalues can be optimally sh...
Estimating the covariance matrix of a random vector is essential and challenging in large dimension ...
This article studies two regularized robust estimators of scatter matrices proposed (and proved to b...
Linear estimation of signals is often based on covariance matrices estimated from training, which ca...
Shrinkage can effectively improve the condition number and accuracy of covariance matrix estimation,...
International audienceIn the context of robust covariance matrix estimation, this work generalizes t...
When estimating covariance matrices, traditional sample covariance-based estimators are straightforw...
For high dimensional data sets the sample covariance matrix is usually unbiased but noisy if the sam...
Provides nonparametric Steinian shrinkage estimators of the covariance matrix that are suitable in h...
AbstractFor high dimensional data sets the sample covariance matrix is usually unbiased but noisy if...
This book provides a self-contained introduction to shrinkage estimation for matrix-variate normal d...
International audienceRecently, in the context of covariance matrix estimation, in order to improve ...
The paper proposes a cross-validated linear shrinkage estimation for population covariance matrices....
Abstract—We address covariance estimation in the sense of minimum mean-squared error (MMSE) when the...
The article studies two regularized robust estimators of scatter matrices proposed in parallel in [1...
Under rotation-equivariant decision theory, sample covariance matrix eigenvalues can be optimally sh...
Estimating the covariance matrix of a random vector is essential and challenging in large dimension ...
This article studies two regularized robust estimators of scatter matrices proposed (and proved to b...
Linear estimation of signals is often based on covariance matrices estimated from training, which ca...
Shrinkage can effectively improve the condition number and accuracy of covariance matrix estimation,...
International audienceIn the context of robust covariance matrix estimation, this work generalizes t...
When estimating covariance matrices, traditional sample covariance-based estimators are straightforw...
For high dimensional data sets the sample covariance matrix is usually unbiased but noisy if the sam...
Provides nonparametric Steinian shrinkage estimators of the covariance matrix that are suitable in h...
AbstractFor high dimensional data sets the sample covariance matrix is usually unbiased but noisy if...
This book provides a self-contained introduction to shrinkage estimation for matrix-variate normal d...
International audienceRecently, in the context of covariance matrix estimation, in order to improve ...
The paper proposes a cross-validated linear shrinkage estimation for population covariance matrices....
Abstract—We address covariance estimation in the sense of minimum mean-squared error (MMSE) when the...
The article studies two regularized robust estimators of scatter matrices proposed in parallel in [1...
Under rotation-equivariant decision theory, sample covariance matrix eigenvalues can be optimally sh...
Estimating the covariance matrix of a random vector is essential and challenging in large dimension ...
This article studies two regularized robust estimators of scatter matrices proposed (and proved to b...