English

Alternating minimization for generalized rank one matrix sensing: Sharp predictions from a random initialization

Optimization and Control 2024-10-02 v2 Probability Statistics Theory Machine Learning Statistics Theory

Abstract

We consider the problem of estimating the factors of a rank-11 matrix with i.i.d. Gaussian, rank-11 measurements that are nonlinearly transformed and corrupted by noise. Considering two prototypical choices for the nonlinearity, we study the convergence properties of a natural alternating update rule for this nonconvex optimization problem starting from a random initialization. We show sharp convergence guarantees for a sample-split version of the algorithm by deriving a deterministic recursion that is accurate even in high-dimensional problems. Notably, while the infinite-sample population update is uninformative and suggests exact recovery in a single step, the algorithm -- and our deterministic prediction -- converges geometrically fast from a random initialization. Our sharp, non-asymptotic analysis also exposes several other fine-grained properties of this problem, including how the nonlinearity and noise level affect convergence behavior. On a technical level, our results are enabled by showing that the empirical error recursion can be predicted by our deterministic sequence within fluctuations of the order n1/2n^{-1/2} when each iteration is run with nn observations. Our technique leverages leave-one-out tools originating in the literature on high-dimensional MM-estimation and provides an avenue for sharply analyzing higher-order iterative algorithms from a random initialization in other high-dimensional optimization problems with random data.

Keywords

Cite

@article{arxiv.2207.09660,
  title  = {Alternating minimization for generalized rank one matrix sensing: Sharp predictions from a random initialization},
  author = {Kabir Aladin Chandrasekher and Mengqi Lou and Ashwin Pananjady},
  journal= {arXiv preprint arXiv:2207.09660},
  year   = {2024}
}

Comments

v2 is consistent with version to appear in Information and Inference: A Journal of the IMA

R2 v1 2026-06-25T01:04:13.337Z