English

Fast Stochastic Second-Order Adagrad for Nonconvex Bound-Constrained Optimization

Optimization and Control 2025-05-13 v1

Abstract

ADAGB2, a generalization of the Adagrad algorithm for stochastic optimization is introduced, which is also applicable to bound-constrained problems and capable of using second-order information when available. It is shown that, given δ(0,1)\delta\in(0,1) and ϵ(0,1]\epsilon\in(0,1], the ADAGB2 algorithm needs at most \calO(ϵ2)\calO(\epsilon^{-2}) iterations to ensure an ϵ\epsilon-approximate first-order critical point of the bound-constrained problem with probability at least 1δ1-\delta, provided the average root mean square error of the gradient oracle is sufficiently small. Should this condition fail, it is also shown that the optimality level of iterates is bounded above by this average. The relation between the approximate and true classical projected-gradient-based optimality measures for bound constrained problems is also investigated, and it is shown that merely assuming unbiased gradient oracles may be insufficient to ensure convergence in \calO(ϵ2)\calO(\epsilon^{-2}) iterations.

Keywords

Cite

@article{arxiv.2505.06374,
  title  = {Fast Stochastic Second-Order Adagrad for Nonconvex Bound-Constrained Optimization},
  author = {S. Bellavia and S. Gratton and B. Morini and Ph. L. Toint},
  journal= {arXiv preprint arXiv:2505.06374},
  year   = {2025}
}
R2 v1 2026-06-28T23:27:45.278Z