Add to ORKGWe consider the problem of quantifying uncertainty for the estimation error of the leading eigenvector from Oja's algorithm for streaming principal component analysis, where the data are generated IID from some unknown distribution. By combining classical tools from the U-statistics literature with recent results on high-dimensional central limit theorems for quadratic forms of random vectors and concentration of matrix products, we establish a weighted $\chi^2$ approximation result for the $\sin^2$ error between the population eigenvector and the output of Oja's algorithm. Since estimating the covariance matrix associated with the approximating distribution requires knowledge of unknown model parameters, we propose a multiplier bootstrap a...
The bootstrap is an increasingly popular method for performing statistical inference. This paper pro...
How do statistical dependencies in measurement noise influence high-dimensional inference? To answer...
Principal component analysis (PCA) has been a prominent tool for high-dimensional data analysis. Onl...
In this paper, we propose to adopt the diffusion approximation tools to study the dynamics of Oja's ...
Many articles were devoted to the problem of estimating recursively the eigenvectors and eigenvalues...
International audienceWe prove the almost sure convergence of Oja-type processes to eigenvectors of ...
In this paper, we study the problems of principal Generalized Eigenvector computation and Canonical ...
Abstract—Eigenvalue analysis is an important aspect in many data modeling methods. Unfortunately, th...
It is known that the least-squares class of algorithms produce unbiased estimates providing certain ...
ABSTRACT. Bootstrap methods are widely used for distribution estimation, al-though in some problems ...
We computationally investigate two approaches for uncertainty quantification in inverse problems for...
Abstract. This paper studies a method, which has been proposed in the Physics literature by [8, 7, 1...
Eigenvalue analysis is an important aspect in many data modeling methods. Unfortunately, the eigenva...
A bootstrap method for generating confidence intervals in linear models is suggested. The method is ...
Given a positive definite matrix M and an integer N-m >= 1, Oja's subspace algorithm will provide co...
The bootstrap is an increasingly popular method for performing statistical inference. This paper pro...
How do statistical dependencies in measurement noise influence high-dimensional inference? To answer...
Principal component analysis (PCA) has been a prominent tool for high-dimensional data analysis. Onl...
In this paper, we propose to adopt the diffusion approximation tools to study the dynamics of Oja's ...
Many articles were devoted to the problem of estimating recursively the eigenvectors and eigenvalues...
International audienceWe prove the almost sure convergence of Oja-type processes to eigenvectors of ...
In this paper, we study the problems of principal Generalized Eigenvector computation and Canonical ...
Abstract—Eigenvalue analysis is an important aspect in many data modeling methods. Unfortunately, th...
It is known that the least-squares class of algorithms produce unbiased estimates providing certain ...
ABSTRACT. Bootstrap methods are widely used for distribution estimation, al-though in some problems ...
We computationally investigate two approaches for uncertainty quantification in inverse problems for...
Abstract. This paper studies a method, which has been proposed in the Physics literature by [8, 7, 1...
Eigenvalue analysis is an important aspect in many data modeling methods. Unfortunately, the eigenva...
A bootstrap method for generating confidence intervals in linear models is suggested. The method is ...
Given a positive definite matrix M and an integer N-m >= 1, Oja's subspace algorithm will provide co...
The bootstrap is an increasingly popular method for performing statistical inference. This paper pro...
How do statistical dependencies in measurement noise influence high-dimensional inference? To answer...
Principal component analysis (PCA) has been a prominent tool for high-dimensional data analysis. Onl...