English

Horoballs and the subgradient method

Optimization and Control 2024-04-04 v2 Computational Complexity Machine Learning

Abstract

To explore convex optimization on Hadamard spaces, we consider an iteration in the style of a subgradient algorithm. Traditionally, such methods assume that the underlying spaces are manifolds and that the objectives are geodesically convex: the methods are described using tangent spaces and exponential maps. By contrast, our iteration applies in a general Hadamard space, is framed in the underlying space itself, and relies instead on horospherical convexity of the objective level sets. For this restricted class of objectives, we prove a complexity result of the usual form. Notably, the complexity does not depend on a lower bound on the space curvature. We illustrate our subgradient algorithm on the minimal enclosing ball problem in Hadamard spaces.

Keywords

Cite

@article{arxiv.2403.15749,
  title  = {Horoballs and the subgradient method},
  author = {Adrian S. Lewis and Genaro Lopez-Acedo and Adriana Nicolae},
  journal= {arXiv preprint arXiv:2403.15749},
  year   = {2024}
}
R2 v1 2026-06-28T15:30:54.068Z