Subspace recovery from the corrupted and missing data is crucial for various applications in signal processing and information theory. To complete missing values and detect column corruptions, the existing robust matrix completion (MC) methods mostly concentrate on recovering a low-rank matrix from a few corrupted coefficients with respect to standard basis, which, however, does not apply to more general basis, e.g., Fourier basis. In this paper, we prove that the range space of an m x n matrix with rank r can be exactly recovered from a few coefficients with respect to general basis, though r and the number of corrupted samples are both as high as O(min{m, n}/log(3)(m + n)). Our model covers the previous ones as special cases, and robust M...
The low-rank matrix completion problem is a fundamental machine learning problem with many important...
Low-rank matrix completion is the problem where one tries to recover a low-rank matrix from noisy ob...
146 pagesThe problem of Matrix Completion has been widely studied over the past decade. However, the...
This paper considers the recovery of a low-rank matrix from an observed version that simultaneously ...
In this work we address the subspace recovery problem. Given a set of data samples (vectors) approxi...
This paper considers the problem of completing a matrix with many missing entries under the as-sumpt...
Low-rank matrix recovery (LRMR) has been becoming an increasingly popular technique for analyzing da...
International audienceThis paper considers the problem of recovery of a low-rank matrix in the situa...
This paper studies the matrix completion problem under arbitrary sampling schemes. We propose a new ...
Let X* be a n_1 × n_2 matrix with entries in F_2 and rank r <; min(n_1, n_2) (often r ≪ min(n_1, n_2...
In this paper, we address the subspace clustering problem. Given a set of data samples (vectors) app...
For the problems of low-rank matrix completion, the efficiency of the widely used nuclear norm techn...
Low-rank matrix recovery problems arise naturally as mathematical formulations of various inverse pr...
We propose a general framework for reconstructing and denoising single entries of incomplete and noi...
Recovering arbitrarily corrupted low-rank matrices arises in computer vision applications, including...
The low-rank matrix completion problem is a fundamental machine learning problem with many important...
Low-rank matrix completion is the problem where one tries to recover a low-rank matrix from noisy ob...
146 pagesThe problem of Matrix Completion has been widely studied over the past decade. However, the...
This paper considers the recovery of a low-rank matrix from an observed version that simultaneously ...
In this work we address the subspace recovery problem. Given a set of data samples (vectors) approxi...
This paper considers the problem of completing a matrix with many missing entries under the as-sumpt...
Low-rank matrix recovery (LRMR) has been becoming an increasingly popular technique for analyzing da...
International audienceThis paper considers the problem of recovery of a low-rank matrix in the situa...
This paper studies the matrix completion problem under arbitrary sampling schemes. We propose a new ...
Let X* be a n_1 × n_2 matrix with entries in F_2 and rank r <; min(n_1, n_2) (often r ≪ min(n_1, n_2...
In this paper, we address the subspace clustering problem. Given a set of data samples (vectors) app...
For the problems of low-rank matrix completion, the efficiency of the widely used nuclear norm techn...
Low-rank matrix recovery problems arise naturally as mathematical formulations of various inverse pr...
We propose a general framework for reconstructing and denoising single entries of incomplete and noi...
Recovering arbitrarily corrupted low-rank matrices arises in computer vision applications, including...
The low-rank matrix completion problem is a fundamental machine learning problem with many important...
Low-rank matrix completion is the problem where one tries to recover a low-rank matrix from noisy ob...
146 pagesThe problem of Matrix Completion has been widely studied over the past decade. However, the...