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Matrix Completion

Matrix Completion is a method for recovering lost information. It originates from machine learning and usually deals with highly sparse matrices. Missing or unknown data is estimated using the low-rank matrix of the known data.

Source: A Fast Matrix-Completion-Based Approach for Recommendation Systems

Papers

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Showing 561570 of 796 papers

TitleStatusHype
On the Optimality of Nuclear-norm-based Matrix Completion for Problems with Smooth Non-linear Structure0
Can Learning Be Explained By Local Optimality In Robust Low-rank Matrix Recovery?0
On the Power of Adaptivity in Matrix Completion and Approximation0
On the Power of Truncated SVD for General High-rank Matrix Estimation Problems0
On the Predictability of Human Assessment: when Matrix Completion Meets NLP Evaluation0
On the properties of variational approximations of Gibbs posteriors0
On the simplicity and conditioning of low rank semidefinite programs0
On the Robustness of Cross-Concentrated Sampling for Matrix Completion0
Optimal (0,1)-Matrix Completion with Majorization Ordered Objectives (To the memory of Pravin Varaiya)0
Optimal Exact Matrix Completion Under new Parametrization0
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