Abstract. The problem of estimating a spiked covariance matrix in high dimensions under Frobenius loss, and the parallel problem of es-timating the noise in spiked PCA is investigated. We propose an esti-mator of the noise parameter by minimizing an unbiased estimator of the invariant Frobenius risk using calculus of variations. The resulting estimator is shown, using random matrix theory, to be strongly consis-tent and essentially asymptotically normal and minimax for the noise estimation problem. We apply the construction to construct a robust spiked covariance matrix estimator with consistent eigenvalues. 1
We study the problem of estimating the leading eigenvectors of a high-dimensional population covaria...
International audienceIn this paper, we investigate the existence and the algorithm analysis of an a...
We study the problem of estimating the leading eigenvectors of a high-dimensional populatio...
This thesis derives natural and efficient solutions of three high-dimensional statistical problems b...
In this paper, we consider the estimation for the inverse matrix of a high-dimensional covariance ma...
We propose a new pivotal method for estimating high-dimensional matrices. Assume that we observe a s...
How do statistical dependencies in measurement noise influence high-dimensional inference? To answer...
International audienceThis paper deals with covariance matrix estimates in impulsive noise environme...
A class of robust estimators of scatter applied to information-plus-impulsive noise samples is studi...
This paper considers a sparse spiked covariance matrix model in the high-dimensional setting and stu...
In this paper, we consider the Group Lasso estimator of the covariance matrix of a stochastic proces...
International audienceThe problem of infering the top component of a noisy sample covariance matrix ...
In a spiked population model, the population covariance matrix has all its eigenvalues equal to unit...
International audienceA class of robust estimators of scatter applied to information-plus-impulsive ...
International audienceThis paper aims at providing an original Riemannian geometry to derive robust ...
We study the problem of estimating the leading eigenvectors of a high-dimensional population covaria...
International audienceIn this paper, we investigate the existence and the algorithm analysis of an a...
We study the problem of estimating the leading eigenvectors of a high-dimensional populatio...
This thesis derives natural and efficient solutions of three high-dimensional statistical problems b...
In this paper, we consider the estimation for the inverse matrix of a high-dimensional covariance ma...
We propose a new pivotal method for estimating high-dimensional matrices. Assume that we observe a s...
How do statistical dependencies in measurement noise influence high-dimensional inference? To answer...
International audienceThis paper deals with covariance matrix estimates in impulsive noise environme...
A class of robust estimators of scatter applied to information-plus-impulsive noise samples is studi...
This paper considers a sparse spiked covariance matrix model in the high-dimensional setting and stu...
In this paper, we consider the Group Lasso estimator of the covariance matrix of a stochastic proces...
International audienceThe problem of infering the top component of a noisy sample covariance matrix ...
In a spiked population model, the population covariance matrix has all its eigenvalues equal to unit...
International audienceA class of robust estimators of scatter applied to information-plus-impulsive ...
International audienceThis paper aims at providing an original Riemannian geometry to derive robust ...
We study the problem of estimating the leading eigenvectors of a high-dimensional population covaria...
International audienceIn this paper, we investigate the existence and the algorithm analysis of an a...
We study the problem of estimating the leading eigenvectors of a high-dimensional populatio...