English

Lower Bounds for Linear Minimization Oracle Methods Optimizing over Strongly Convex Sets

Optimization and Control 2026-02-27 v1

Abstract

We consider the oracle complexity of constrained convex optimization given access to a Linear Minimization Oracle (LMO) for the constraint set and a gradient oracle for the LL-smooth, strongly convex objective. This model includes Frank-Wolfe methods and their many variants. Over the problem class of strongly convex constraint sets SS, our main result proves that no such deterministic method can guarantee a final objective gap less than ε\varepsilon in fewer than Ω(Ldiam(S)2/ε)\Omega(\sqrt{L\, \mathrm{diam}(S)^2/\varepsilon}) iterations. Our lower bound matches, up to constants, the accelerated Frank-Wolfe theory of Garber and Hazan (2015). Together, these establish this as the optimal complexity for deterministic LMO methods over strongly convex constraint sets. Second, we consider optimization over β\beta-smooth sets, finding that in the modestly smooth regime of β=Ω(1/ε)\beta=\Omega(1/\sqrt{\varepsilon}), no complexity improvement for span-based LMO methods is possible against either compact convex sets or strongly convex sets.

Keywords

Cite

@article{arxiv.2602.22608,
  title  = {Lower Bounds for Linear Minimization Oracle Methods Optimizing over Strongly Convex Sets},
  author = {Benjamin Grimmer and Ning Liu},
  journal= {arXiv preprint arXiv:2602.22608},
  year   = {2026}
}

Comments

17 pages

R2 v1 2026-07-01T10:53:17.944Z