Noisy Pairwise-Comparison Random Search for Smooth Nonconvex Optimization
Abstract
We consider minimizing high-dimensional smooth nonconvex objectives using only noisy pairwise comparisons. Unlike classical zeroth-order methods limited by the ambient dimension , we propose Noisy-Comparison Random Search (NCRS), a direct-search method that exploits random line search to adapt to the intrinsic dimension . We establish novel non-convex convergence guarantees for approximate stationarity: under a uniform-margin oracle, NCRS attains -stationarity with complexity , explicitly replacing ambient dependence with the intrinsic dimension. Furthermore, we introduce a general tie-aware noise model where comparison quality degrades near ties; for this setting, we prove that a majority-vote variant of NCRS achieves -stationarity with complexity .
Cite
@article{arxiv.2601.21166,
title = {Noisy Pairwise-Comparison Random Search for Smooth Nonconvex Optimization},
author = {Taha El Bakkali and Rayane Bouftini and Qiuyi Zhang and Omar Saadi},
journal= {arXiv preprint arXiv:2601.21166},
year = {2026}
}