Global Convergence of Four-Layer Matrix Factorization under Random Initialization
Abstract
Gradient descent dynamics on the deep matrix factorization problem is extensively studied as a simplified theoretical model for deep neural networks. Although the convergence theory for two-layer matrix factorization is well-established, no global convergence guarantee for general deep matrix factorization under random initialization has been established to date. To address this gap, we provide a polynomial-time global convergence guarantee for randomly initialized gradient descent on four-layer matrix factorization, given certain conditions on the target matrix and a standard balanced regularization term. Our analysis employs new techniques to show saddle-avoidance properties of gradient decent dynamics, and extends previous theories to characterize the change in eigenvalues of layer weights.
Cite
@article{arxiv.2511.09925,
title = {Global Convergence of Four-Layer Matrix Factorization under Random Initialization},
author = {Minrui Luo and Weihang Xu and Xiang Gao and Maryam Fazel and Simon Shaolei Du},
journal= {arXiv preprint arXiv:2511.09925},
year = {2025}
}