English

Robust Independent Component Analysis via Minimum Divergence Estimation

Methodology 2012-10-23 v1

Abstract

Independent component analysis (ICA) has been shown to be useful in many applications. However, most ICA methods are sensitive to data contamination and outliers. In this article we introduce a general minimum U-divergence framework for ICA, which covers some standard ICA methods as special cases. Within the U-family we further focus on the gamma-divergence due to its desirable property of super robustness, which gives the proposed method gamma-ICA. Statistical properties and technical conditions for the consistency of gamma-ICA are rigorously studied. In the limiting case, it leads to a necessary and sufficient condition for the consistency of MLE-ICA. This necessary and sufficient condition is weaker than the condition known in the literature. Since the parameter of interest in ICA is an orthogonal matrix, a geometrical algorithm based on gradient flows on special orthogonal group is introduced to implement gamma-ICA. Furthermore, a data-driven selection for the gamma value, which is critical to the achievement of gamma-ICA, is developed. The performance, especially the robustness, of gamma-ICA in comparison with standard ICA methods is demonstrated through experimental studies using simulated data and image data.

Keywords

Cite

@article{arxiv.1210.5578,
  title  = {Robust Independent Component Analysis via Minimum Divergence Estimation},
  author = {Peng-Wen Chen and Hung Hung and Osamu Komori and Su-Yun Huang and Shinto Eguchi},
  journal= {arXiv preprint arXiv:1210.5578},
  year   = {2012}
}

Comments

7 figures

R2 v1 2026-06-21T22:25:04.299Z