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Low-Rank Matrix Completion

Low-Rank Matrix Completion is an important problem with several applications in areas such as recommendation systems, sketching, and quantum tomography. The goal in matrix completion is to recover a low rank matrix, given a small number of entries of the matrix.

Source: Universal Matrix Completion

Papers

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Showing 110 of 158 papers

TitleStatusHype
New Hardness Results for Low-Rank Matrix Completion0
AltGDmin: Alternating GD and Minimization for Partly-Decoupled (Federated) Optimization0
Truncated Matrix Completion - An Empirical Study0
Norm-Bounded Low-Rank Adaptation0
Faster Convergence of Riemannian Stochastic Gradient Descent with Increasing Batch Size0
Low rank matrix completion and realization of graphs: results and problems0
A privacy-preserving distributed credible evidence fusion algorithm for collective decision-making0
Efficient and Robust Freeway Traffic Speed Estimation under Oblique Grid using Vehicle Trajectory DataCode0
Abrupt Learning in Transformers: A Case Study on Matrix Completion0
Riemannian Optimization for Non-convex Euclidean Distance Geometry with Global Recovery Guarantees0
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