English

Universal heavy-ball method for nonconvex optimization under H\"older continuous Hessians

Optimization and Control 2026-01-05 v2

Abstract

We propose a new first-order method for minimizing nonconvex functions with Lipschitz continuous gradients and H\"older continuous Hessians. The proposed algorithm is a heavy-ball method equipped with two particular restart mechanisms. It finds a solution where the gradient norm is less than ϵ\epsilon in O(Hν12+2νϵ4+3ν2+2ν)O(H_{\nu}^{\frac{1}{2 + 2 \nu}} \epsilon^{- \frac{4 + 3 \nu}{2 + 2 \nu}}) function and gradient evaluations, where ν[0,1]\nu \in [0, 1] and HνH_{\nu} are the H\"older exponent and constant, respectively. Our algorithm is ν\nu-independent and thus universal; it automatically achieves the above complexity bound with the optimal ν[0,1]\nu \in [0, 1] without knowledge of HνH_{\nu}. In addition, the algorithm does not require other problem-dependent parameters as input, including the gradient's Lipschitz constant or the target accuracy ϵ\epsilon. Numerical results illustrate that the proposed method is promising.

Keywords

Cite

@article{arxiv.2303.01073,
  title  = {Universal heavy-ball method for nonconvex optimization under H\"older continuous Hessians},
  author = {Naoki Marumo and Akiko Takeda},
  journal= {arXiv preprint arXiv:2303.01073},
  year   = {2026}
}
R2 v1 2026-06-28T08:56:21.185Z