We propose a novel class of algorithms for low rank matrix completion. Our approach builds on novel penalty functions on the singular values of the low rank matrix. By exploiting a mixture model representation of this penalty, we show that a suitably chosen set of latent variables enables to derive an Expectation-Maximization algorithm to obtain a Maximum A Posteriori estimate of the completed low rank matrix. The resulting algorithm is an iterative soft-thresholded algorithm which iteratively adapts the shrinkage coefficients associated to the singular values. The algorithm is simple to implement and can scale to large matrices. We provide numerical comparisons between our approach and recent alternatives showing the interest of the propos...
International audienceWe consider the matrix completion problem where the aim is to esti-mate a larg...
Matrix completion is the process of estimating missing entries from a matrix using some prior knowle...
The completion of low rank matrices from few entries is a task with many practical applications. We ...
We propose a novel class of algorithms for low rank matrix completion. Our ap-proach builds on novel...
Abstract. Matrices of low rank can be uniquely determined from fewer linear measurements, or entries...
Given a data matrix with partially observed entries, the low-rank matrix completion problem is one o...
Bayesian matrix completion has been studied based on a low-rank matrix factorization formulation wit...
In the fields of artificial intelligence and machine learning, we are often interested in making pro...
We propose a general framework for reconstructing and denoising single entries of incomplete and noi...
The completion of low rank matrices from few entries is a task with many practical applications. We ...
The low-rank matrix completion problem is a fundamental machine learning problem with many important...
A low-rank matrix can be recovered from a small number of its linear measurements. As a special case...
This paper studies the matrix completion problem under arbitrary sampling schemes. We propose a new ...
A solution to low-rank matrix completion is a matrix M of rank r that is much smaller than the dimen...
Low-rank matrix completion is the problem where one tries to recover a low-rank matrix from noisy ob...
International audienceWe consider the matrix completion problem where the aim is to esti-mate a larg...
Matrix completion is the process of estimating missing entries from a matrix using some prior knowle...
The completion of low rank matrices from few entries is a task with many practical applications. We ...
We propose a novel class of algorithms for low rank matrix completion. Our ap-proach builds on novel...
Abstract. Matrices of low rank can be uniquely determined from fewer linear measurements, or entries...
Given a data matrix with partially observed entries, the low-rank matrix completion problem is one o...
Bayesian matrix completion has been studied based on a low-rank matrix factorization formulation wit...
In the fields of artificial intelligence and machine learning, we are often interested in making pro...
We propose a general framework for reconstructing and denoising single entries of incomplete and noi...
The completion of low rank matrices from few entries is a task with many practical applications. We ...
The low-rank matrix completion problem is a fundamental machine learning problem with many important...
A low-rank matrix can be recovered from a small number of its linear measurements. As a special case...
This paper studies the matrix completion problem under arbitrary sampling schemes. We propose a new ...
A solution to low-rank matrix completion is a matrix M of rank r that is much smaller than the dimen...
Low-rank matrix completion is the problem where one tries to recover a low-rank matrix from noisy ob...
International audienceWe consider the matrix completion problem where the aim is to esti-mate a larg...
Matrix completion is the process of estimating missing entries from a matrix using some prior knowle...
The completion of low rank matrices from few entries is a task with many practical applications. We ...