In this paper, we study the problems of principal Generalized Eigenvector computation and Canonical Correlation Analysis in the stochastic setting. We propose a simple and efficient algorithm, Gen-Oja, for these problems. We prove the global convergence of our algorithm, borrowing ideas from the theory of fast-mixing Markov chains and two-time-scale stochastic approximation, showing that it achieves the optimal rate of convergence. In the process, we develop tools for understanding stochastic processes with Markovian noise which might be of independent interest
We propose a new algorithm for sparse estimation of eigenvectors in generalized eigenvalue problems ...
A new algebraic multilevel algorithm for computing the second eigenvector of a column-stochastic mat...
We study stochastic algorithms in a streaming framework, trained on samples coming from a dependent ...
International audienceWe widened the scope of the 0ja's eigenvector stochastic approximation process...
This paper presents a novel algorithm for finding the solution of the generalized eigenproblem where...
This paper presents a novel algorithm for analysis of stochastic processes. The algorithm can be use...
International audienceWe prove the almost sure convergence of Oja-type processes to eigenvectors of ...
International audienceThe generalized Hermitian eigendecomposition problem is ubiquitous in signal a...
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...
Given a positive definite matrix M and an integer N-m >= 1, Oja's subspace algorithm will provide co...
Abstract. This paper studies a method, which has been proposed in the Physics literature by [8, 7, 1...
The first graduate-level textbook to focus on fundamental aspects of numerical methods for stochasti...
We consider the problem of quantifying uncertainty for the estimation error of the leading eigenvect...
We consider the stochastic approximation problem in a streaming framework where an objective is mini...
We propose a new algorithm for sparse estimation of eigenvectors in generalized eigenvalue problems ...
A new algebraic multilevel algorithm for computing the second eigenvector of a column-stochastic mat...
We study stochastic algorithms in a streaming framework, trained on samples coming from a dependent ...
International audienceWe widened the scope of the 0ja's eigenvector stochastic approximation process...
This paper presents a novel algorithm for finding the solution of the generalized eigenproblem where...
This paper presents a novel algorithm for analysis of stochastic processes. The algorithm can be use...
International audienceWe prove the almost sure convergence of Oja-type processes to eigenvectors of ...
International audienceThe generalized Hermitian eigendecomposition problem is ubiquitous in signal a...
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...
Given a positive definite matrix M and an integer N-m >= 1, Oja's subspace algorithm will provide co...
Abstract. This paper studies a method, which has been proposed in the Physics literature by [8, 7, 1...
The first graduate-level textbook to focus on fundamental aspects of numerical methods for stochasti...
We consider the problem of quantifying uncertainty for the estimation error of the leading eigenvect...
We consider the stochastic approximation problem in a streaming framework where an objective is mini...
We propose a new algorithm for sparse estimation of eigenvectors in generalized eigenvalue problems ...
A new algebraic multilevel algorithm for computing the second eigenvector of a column-stochastic mat...
We study stochastic algorithms in a streaming framework, trained on samples coming from a dependent ...