On a Problem of Weighted Low-Rank Approximation of Matrices
For researchers in matrix approximation, this provides a new algorithmic approach to a known problem, but the results are incremental.
The paper studies a weighted low-rank approximation problem inspired by constrained low-rank approximation, reducing to prior work in limiting cases. It proposes an ADMM-based algorithm and compares it with state-of-the-art methods like weighted total alternating least squares and EM algorithm.
We study a weighted low rank approximation that is inspired by a problem of constrained low rank approximation of matrices as initiated by the work of Golub, Hoffman, and Stewart (Linear Algebra and Its Applications, 88-89(1987), 317-327). Our results reduce to that of Golub, Hoffman, and Stewart in the limiting cases. We also propose an algorithm based on the alternating direction method to solve our weighted low rank approximation problem and compare it with the state-of-art general algorithms such as the weighted total alternating least squares and the EM algorithm.