Saved in:
Bibliographic Details
Main Authors: Collins-Woodfin, Elizabeth, Seroussi, Inbar
Format: Preprint
Published: 2025
Subjects:
Online Access:https://arxiv.org/abs/2510.14074
Tags: Add Tag
No Tags, Be the first to tag this record!
_version_ 1866914096120594432
author Collins-Woodfin, Elizabeth
Seroussi, Inbar
author_facet Collins-Woodfin, Elizabeth
Seroussi, Inbar
contents We develop a framework for analyzing the training and learning rate dynamics on a variety of high- dimensional optimization problems trained using one-pass stochastic gradient descent (SGD) with data generated from multiple anisotropic classes. We give exact expressions for a large class of functions of the limiting dynamics, including the risk and the overlap with the true signal, in terms of a deterministic solution to a system of ODEs. We extend the existing theory of high-dimensional SGD dynamics to Gaussian-mixture data and a large (growing with the parameter size) number of classes. We then investigate in detail the effect of the anisotropic structure of the covariance of the data in the problems of binary logistic regression and least square loss. We study three cases: isotropic covariances, data covariance matrices with a large fraction of zero eigenvalues (denoted as the zero-one model), and covariance matrices with spectra following a power-law distribution. We show that there exists a structural phase transition. In particular, we demonstrate that, for the zero-one model and the power-law model with sufficiently large power, SGD tends to align more closely with values of the class mean that are projected onto the "clean directions" (i.e., directions of smaller variance). This is supported by both numerical simulations and analytical studies, which show the exact asymptotic behavior of the loss in the high-dimensional limit.
format Preprint
id arxiv_https___arxiv_org_abs_2510_14074
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Exact Dynamics of Multi-class Stochastic Gradient Descent
Collins-Woodfin, Elizabeth
Seroussi, Inbar
Machine Learning
Optimization and Control
Probability
60H30
We develop a framework for analyzing the training and learning rate dynamics on a variety of high- dimensional optimization problems trained using one-pass stochastic gradient descent (SGD) with data generated from multiple anisotropic classes. We give exact expressions for a large class of functions of the limiting dynamics, including the risk and the overlap with the true signal, in terms of a deterministic solution to a system of ODEs. We extend the existing theory of high-dimensional SGD dynamics to Gaussian-mixture data and a large (growing with the parameter size) number of classes. We then investigate in detail the effect of the anisotropic structure of the covariance of the data in the problems of binary logistic regression and least square loss. We study three cases: isotropic covariances, data covariance matrices with a large fraction of zero eigenvalues (denoted as the zero-one model), and covariance matrices with spectra following a power-law distribution. We show that there exists a structural phase transition. In particular, we demonstrate that, for the zero-one model and the power-law model with sufficiently large power, SGD tends to align more closely with values of the class mean that are projected onto the "clean directions" (i.e., directions of smaller variance). This is supported by both numerical simulations and analytical studies, which show the exact asymptotic behavior of the loss in the high-dimensional limit.
title Exact Dynamics of Multi-class Stochastic Gradient Descent
topic Machine Learning
Optimization and Control
Probability
60H30
url https://arxiv.org/abs/2510.14074