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Singular Subspace Perturbation Bounds via Rectangular Random Matrix Diffusions

Statistics Theory 2024-06-05 v1 Data Structures and Algorithms Numerical Analysis Numerical Analysis Probability Statistics Theory

Abstract

Given a matrix ARm×dA \in \mathbb{R}^{m\times d} with singular values σ1σd\sigma_1\geq \cdots \geq \sigma_d, and a random matrix GRm×dG \in \mathbb{R}^{m\times d} with iid N(0,T)N(0,T) entries for some T>0T>0, we derive new bounds on the Frobenius distance between subspaces spanned by the top-kk (right) singular vectors of AA and A+GA+G. This problem arises in numerous applications in statistics where a data matrix may be corrupted by Gaussian noise, and in the analysis of the Gaussian mechanism in differential privacy, where Gaussian noise is added to data to preserve private information. We show that, for matrices AA where the gaps in the top-kk singular values are roughly Ω(σkσk+1)\Omega(\sigma_k-\sigma_{k+1}) the expected Frobenius distance between the subspaces is O~(dσkσk+1×T)\tilde{O}(\frac{\sqrt{d}}{\sigma_k-\sigma_{k+1}} \times \sqrt{T}), improving on previous bounds by a factor of mdk\frac{\sqrt{m}}{\sqrt{d}} \sqrt{k}. To obtain our bounds we view the perturbation to the singular vectors as a diffusion process -- the Dyson-Bessel process -- and use tools from stochastic calculus to track the evolution of the subspace spanned by the top-kk singular vectors.

Keywords

Cite

@article{arxiv.2406.02502,
  title  = {Singular Subspace Perturbation Bounds via Rectangular Random Matrix Diffusions},
  author = {Peiyao Lai and Oren Mangoubi},
  journal= {arXiv preprint arXiv:2406.02502},
  year   = {2024}
}
R2 v1 2026-06-28T16:53:15.685Z