A Regression-Based Prediction-Correction Method for Stochastic Time-Varying Optimization Problems
Abstract
In many real-world applications, optimization problems evolve continuously over time and are often subject to stochastic noise. We consider a stochastic time-varying optimization problem in which the objective function changes continuously and only noisy gradient observations are available. In deterministic settings, the prediction-correction method that exploits the time derivative of the solution is effective for accurately tracking the solution trajectory. However, a straightforward extension to stochastic problems requires an estimate of and the computation of a Hessian inverse at each step--requirements that are difficult or costly in practice. To address these issues, we propose a prediction-correction algorithm that uses a regression-based prediction step: the prediction is formed as a linear combination of recent iterates, which can be computed efficiently without estimating or computing Hessian inversions. We prove a tracking-error bound for the proposed method under standard smoothness and stochastic assumptions. Numerical experiments show that the regression-based prediction improves tracking accuracy while reducing computational cost compared with existing methods.
Cite
@article{arxiv.2512.15205,
title = {A Regression-Based Prediction-Correction Method for Stochastic Time-Varying Optimization Problems},
author = {Tomoya Kamijima and Naoki Marumo and Akiko Takeda},
journal= {arXiv preprint arXiv:2512.15205},
year = {2025}
}
Comments
22 pages, 2 figures