Min-Max Grassmannian Optimization for Online Subspace Tracking
Abstract
This paper discusses robustness guarantees for online tracking of time-varying subspaces from noisy data. Building on recent work in optimization over a Grassmannian manifold, we introduce a new approach for robust subspace tracking by modeling data uncertainty in a Grassmannian ball. The robust subspace tracking problem is cast into a min-max optimization framework, for which we derive a closed-form solution for the worst-case subspace, enabling a geometric robustness adjustment that is both analytically tractable and computationally efficient, unlike iterative convex relaxations. The resulting algorithm, GeRoST (Geometrically Robust Subspace Tracking), is validated on two case studies: tracking a linear time-varying system and online foreground-background separation in video.
Cite
@article{arxiv.2604.00825,
title = {Min-Max Grassmannian Optimization for Online Subspace Tracking},
author = {Shreyas Bharadwaj and Bamdev Mishra and Cyrus Mostajeran and Alberto Padoan and Jeremy Coulson and Ravi Banavar},
journal= {arXiv preprint arXiv:2604.00825},
year = {2026}
}
Comments
Submitted to the 65th IEEE Conference on Decision and Control, December 15-18 2026, Honolulu, Hawaii, USA