English

On a Gradient Approach to Chebyshev Center Problems with Applications to Function Learning

Optimization and Control 2026-01-13 v1 Artificial Intelligence Machine Learning

Abstract

We introduce gradOL\textsf{gradOL}, the first gradient-based optimization framework for solving Chebyshev center problems, a fundamental challenge in optimal function learning and geometric optimization. gradOL\textsf{gradOL} hinges on reformulating the semi-infinite problem as a finitary max-min optimization, making it amenable to gradient-based techniques. By leveraging automatic differentiation for precise numerical gradient computation, gradOL\textsf{gradOL} ensures numerical stability and scalability, making it suitable for large-scale settings. Under strong convexity of the ambient norm, gradOL\textsf{gradOL} provably recovers optimal Chebyshev centers while directly computing the associated radius. This addresses a key bottleneck in constructing stable optimal interpolants. Empirically, gradOL\textsf{gradOL} achieves significant improvements in accuracy and efficiency on 34 benchmark Chebyshev center problems from a benchmark CSIP\textsf{CSIP} library. Moreover, we extend gradOL\textsf{gradOL} to general convex semi-infinite programming (CSIP), attaining up to 4000×4000\times speedups over the state-of-the-art SIPAMPL\texttt{SIPAMPL} solver tested on the indicated CSIP\textsf{CSIP} library containing 67 benchmark problems. Furthermore, we provide the first theoretical foundation for applying gradient-based methods to Chebyshev center problems, bridging rigorous analysis with practical algorithms. gradOL\textsf{gradOL} thus offers a unified solution framework for Chebyshev centers and broader CSIPs.

Keywords

Cite

@article{arxiv.2601.06434,
  title  = {On a Gradient Approach to Chebyshev Center Problems with Applications to Function Learning},
  author = {Abhinav Raghuvanshi and Mayank Baranwal and Debasish Chatterjee},
  journal= {arXiv preprint arXiv:2601.06434},
  year   = {2026}
}

Comments

Accepted to TMLR

R2 v1 2026-07-01T08:58:45.948Z