English

Variance-Reduced Fast Krasnoselkii-Mann Methods for Finite-Sum Root-Finding Problems

Optimization and Control 2025-06-09 v3 Machine Learning

Abstract

We propose a new class of fast Krasnoselkii--Mann methods with variance reduction to solve a finite-sum co-coercive equation Gx=0Gx = 0. Our algorithm is single-loop and leverages a new family of unbiased variance-reduced estimators specifically designed for a wider class of root-finding algorithms. Our method achieves both O(1/k2)\mathcal{O}(1/k^2) and o(1/k2)o(1/k^2) last-iterate convergence rates in terms of E[Gxk2]\mathbb{E}[\| Gx^k\|^2], where kk is the iteration counter and E[]\mathbb{E}[\cdot] is the total expectation. We also establish almost sure o(1/k2)o(1/k^2) convergence rates and the almost sure convergence of iterates {xk}\{x^k\} to a solution of Gx=0Gx=0. We instantiate our framework for two prominent estimators: SVRG and SAGA. By an appropriate choice of parameters, both variants attain an oracle complexity of O(n+n2/3ϵ1)\mathcal{O}(n + n^{2/3}\epsilon^{-1}) to reach an ϵ\epsilon-solution, where nn represents the number of summands in the finite-sum operator GG. Furthermore, under σ\sigma-strong quasi-monotonicity, our method achieves a linear convergence rate and an oracle complexity of O(n+max{n,n2/3κ}log(1ϵ))\mathcal{O}(n+ \max\{n, n^{2/3}\kappa\} \log(\frac{1}{\epsilon})), where κ:=L/σ\kappa := L/\sigma. We extend our approach to solve a class of finite-sum inclusions (possibly nonmonotone), demonstrating that our schemes retain the same theoretical guarantees as in the equation setting. Finally, numerical experiments validate our algorithms and demonstrate their promising performance compared to state-of-the-art methods.

Keywords

Cite

@article{arxiv.2406.02413,
  title  = {Variance-Reduced Fast Krasnoselkii-Mann Methods for Finite-Sum Root-Finding Problems},
  author = {Quoc Tran-Dinh},
  journal= {arXiv preprint arXiv:2406.02413},
  year   = {2025}
}

Comments

31 pages, 2 figures

R2 v1 2026-06-28T16:53:06.916Z