English

Frank-Wolfe Beyond 1/t Convergence

Optimization and Control 2026-05-05 v2

Abstract

We consider smooth convex minimization over compact convex sets, i.e., minxCf(x)\min_{x \in C} f(x) with the (vanilla) Frank-Wolfe algorithm. Well-known lower bounds establish a worst-case Ω(1/t)\Omega(1/t) primal-gap barrier in the general smooth convex case, and faster convergence usually requires favorable function properties such as H\"older error bounds or strong convexity. We present a new Local Dual Sharpness (LDS) condition, essentially a property of the feasible region and its LMO, under which the Frank-Wolfe algorithm converges in o(1/t)o(1/t) for any smooth convex function, ruling out an Ω(1/t)\Omega(1/t) lower bound under LDS. The condition is a generalization (and localization) of uniform convexity of sets and it is satisfied by any uniformly convex set. To our knowledge, this is the first unconditional o(1/t)o(1/t) convergence result for uniformly convex sets. Combining LDS with stronger function properties, e.g., a local variant of H\"older error bounds, allows us to quantify the actual rates.

Keywords

Cite

@article{arxiv.2604.28006,
  title  = {Frank-Wolfe Beyond 1/t Convergence},
  author = {Sebastian Pokutta},
  journal= {arXiv preprint arXiv:2604.28006},
  year   = {2026}
}

Comments

minor updates to tex code and precision of wording

R2 v1 2026-07-01T12:43:50.288Z