We propose a new pivotal method for estimating high-dimensional matrices. Assume that we observe a small set of entries or linear combinations of entries of an unknown matrix $A_0$ corrupted by noise. We propose a new method for estimating $A_0$ which does not rely on the knowledge or an estimation of the standard deviation of the noise $\sigma$. Our estimator achieves, up to a logarithmic factor, optimal rates of convergence under the Frobenius risk and, thus, has the same prediction performance as previously proposed estimators which rely on the knowledge of $\sigma$. Our method is based on the solution of a convex optimization problem which makes it computationally attractive.ou
This dissertation examines some prediction and estimations problems that arise in "high dimensions",...
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International audienceWe propose a new pivotal method for estimating high-dimensional matrices. Assu...
This thesis derives natural and efficient solutions of three high-dimensional statistical problems b...
We analyze a class of estimators based on a convex relaxation for solving high-dimensional matrix de...
Abstract. The problem of estimating a spiked covariance matrix in high dimensions under Frobenius lo...
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International audienceWe consider the problem of estimating the noise level sigma(2) in a Gaussian l...
A fundamental problem in modern high-dimensional data analysis involves efficiently inferring a set ...
We consider the problem of estimating a low-rank signal matrix from noisy measurements under the ass...
International audienceWe consider the estimation problem for an unknown vector beta epsilon R-p in a...
International audienceWe observe $(X_i,Y_i)_{i=1}^n$ where the $Y_i$'s are real valued outputs and t...
This paper considers the problem of estimating a high-dimensional vector of parameters $\boldsymbol{...
This dissertation examines some prediction and estimations problems that arise in "high dimensions",...
Many problems in computer vision can be posed as recovering a low-dimensional subspace from high-dim...
In this paper, we consider the estimation for the inverse matrix of a high-dimensional covariance ma...
International audienceWe propose a new pivotal method for estimating high-dimensional matrices. Assu...
This thesis derives natural and efficient solutions of three high-dimensional statistical problems b...
We analyze a class of estimators based on a convex relaxation for solving high-dimensional matrix de...
Abstract. The problem of estimating a spiked covariance matrix in high dimensions under Frobenius lo...
This paper considers the estimation and inference of the low-rank components in high-dimensional mat...
In this work we construct an optimal shrinkage estimator for the precision matrix in high dimensions...
International audienceWe consider the problem of estimating the noise level sigma(2) in a Gaussian l...
A fundamental problem in modern high-dimensional data analysis involves efficiently inferring a set ...
We consider the problem of estimating a low-rank signal matrix from noisy measurements under the ass...
International audienceWe consider the estimation problem for an unknown vector beta epsilon R-p in a...
International audienceWe observe $(X_i,Y_i)_{i=1}^n$ where the $Y_i$'s are real valued outputs and t...
This paper considers the problem of estimating a high-dimensional vector of parameters $\boldsymbol{...
This dissertation examines some prediction and estimations problems that arise in "high dimensions",...
Many problems in computer vision can be posed as recovering a low-dimensional subspace from high-dim...
In this paper, we consider the estimation for the inverse matrix of a high-dimensional covariance ma...