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Finite-time analysis of Multi-timescale Stochastic Optimization Algorithms

Machine Learning 2026-04-01 v1

Abstract

We present a finite-time analysis of two smoothed functional stochastic approximation algorithms for simulation-based optimization. The first is a two time-scale gradient-based method, while the second is a three time-scale Newton-based algorithm that estimates both the gradient and the Hessian of the objective function JJ. Both algorithms involve zeroth order estimates for the gradient/Hessian. Although the asymptotic convergence of these algorithms has been established in prior work, finite-time guarantees of two-timescale stochastic optimization algorithms in zeroth order settings have not been provided previously. For our Newton algorithm, we derive mean-squared error bounds for the Hessian estimator and establish a finite-time bound on min0mTEJ(θ(m))2\min\limits_{0 \le m \le T} \mathbb{E}\| \nabla J(\theta(m)) \|^2, showing convergence to first-order stationary points. The analysis explicitly characterizes the interaction between multiple time-scales and the propagation of estimation errors. We further identify step-size choices that balance dominant error terms and achieve near-optimal convergence rates. We also provide corresponding finite-time guarantees for the gradient algorithm under the same framework. The theoretical results are further validated through experiments on the Continuous Mountain Car environment.

Keywords

Cite

@article{arxiv.2603.29380,
  title  = {Finite-time analysis of Multi-timescale Stochastic Optimization Algorithms},
  author = {Kaustubh Kartikey and Shalabh Bhatnagar},
  journal= {arXiv preprint arXiv:2603.29380},
  year   = {2026}
}
R2 v1 2026-07-01T11:45:41.311Z