English

Non-Euclidean High-Order Smooth Convex Optimization

Optimization and Control 2025-02-07 v2 Data Structures and Algorithms Machine Learning Machine Learning

Abstract

We develop algorithms for the optimization of convex objectives that have H\"older continuous qq-th derivatives by using a qq-th order oracle, for any q1q \geq 1. Our algorithms work for general norms under mild conditions, including the p\ell_p-settings for 1p1\leq p\leq \infty. We can also optimize structured functions that allow for inexactly implementing a non-Euclidean ball optimization oracle. We do this by developing a non-Euclidean inexact accelerated proximal point method that makes use of an \emph{inexact uniformly convex regularizer}. We show a lower bound for general norms that demonstrates our algorithms are nearly optimal in high-dimensions in the black-box oracle model for p\ell_p-settings and all q1q \geq 1, even in randomized and parallel settings. This new lower bound, when applied to the first-order smooth case, resolves an open question in parallel convex optimization.

Keywords

Cite

@article{arxiv.2411.08987,
  title  = {Non-Euclidean High-Order Smooth Convex Optimization},
  author = {Juan Pablo Contreras and Cristóbal Guzmán and David Martínez-Rubio},
  journal= {arXiv preprint arXiv:2411.08987},
  year   = {2025}
}

Comments

randomized and parallel lower bounds (and gen. to all norms), convexity of subproblems, inexactness of unacc. alg., better writing

R2 v1 2026-06-28T19:59:06.650Z