English

Column Bound for Orthogonal Matrix Factorization

Signal Processing 2024-05-22 v1

Abstract

This article explores the intersection of the Coupon Collector's Problem and the Orthogonal Matrix Factorization (OMF) problem. Specifically, we derive bounds on the minimum number of columns pp (in X\mathbf{X}) required for the OMF problem to be tractable, using insights from the Coupon Collector's Problem. Specifically, we establish a theorem outlining the relationship between the sparsity of the matrix X\mathbf{X} and the number of columns pp required to recover the matrices V\mathbf{V} and X\mathbf{X} in the OMF problem. We show that the minimum number of columns pp required is given by p=Ω(max{n1(1θ)n,1θlogn})p = \Omega \left(\max \left\{ \frac{n}{1 - (1 - \theta)^n}, \frac{1}{\theta} \log n \right\} \right), where θ\theta is the i.i.d Bernoulli parameter from which the sparsity model of the matrix X\mathbf{X} is derived.

Cite

@article{arxiv.2405.12858,
  title  = {Column Bound for Orthogonal Matrix Factorization},
  author = {Anirudh Dash},
  journal= {arXiv preprint arXiv:2405.12858},
  year   = {2024}
}

Comments

5 pages

R2 v1 2026-06-28T16:34:25.489Z