Robust PCA by Manifold Optimization

JMLR 2018 pp. 1-39

/jmlr/2018/zhang2018jmlr-robust/

Abstract

Robust PCA is a widely used statistical procedure to recover an underlying low-rank matrix with grossly corrupted observations. This work considers the problem of robust PCA as a nonconvex optimization problem on the manifold of low-rank matrices and proposes two algorithms based on manifold optimization. It is shown that, with a properly designed initialization, the proposed algorithms are guaranteed to converge to the underlying low-rank matrix linearly. Compared with a previous work based on the factorization of low-rank matrices Yi et al. (2016), the proposed algorithms reduce the dependence on the condition number of the underlying low-rank matrix theoretically. Simulations and real data examples confirm the competitive performance of our method.

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Cite

Text

Zhang and Yang. "Robust PCA by Manifold Optimization." Journal of Machine Learning Research, 2018.

Markdown

[Zhang and Yang. "Robust PCA by Manifold Optimization." Journal of Machine Learning Research, 2018.](https://mlanthology.org/jmlr/2018/zhang2018jmlr-robust/)

BibTeX

@article{zhang2018jmlr-robust,
  title     = {{Robust PCA by Manifold Optimization}},
  author    = {Zhang, Teng and Yang, Yi},
  journal   = {Journal of Machine Learning Research},
  year      = {2018},
  pages     = {1-39},
  volume    = {19},
  url       = {https://mlanthology.org/jmlr/2018/zhang2018jmlr-robust/}
}