English

An Efficient Minimax Optimal Estimator For Multivariate Convex Regression

Statistics Theory 2025-12-30 v2 Machine Learning Metric Geometry Computation Statistics Theory

Abstract

This work studies the computational aspects of multivariate convex regression in dimensions d5d \ge 5. Our results include the \emph{first} estimators that are minimax optimal (up to logarithmic factors) with polynomial runtime in the sample size for both LL-Lipschitz convex regression, and Γ\Gamma-bounded convex regression under polytopal support. Our analysis combines techniques from empirical process theory, stochastic geometry, and potential theory, and leverages recent algorithmic advances in mean estimation for random vectors and in distribution-free linear regression. These results provide the first efficient, minimax-optimal procedures for non-Donsker classes for which their corresponding least-squares estimator is provably minimax-suboptimal.

Keywords

Cite

@article{arxiv.2205.03368,
  title  = {An Efficient Minimax Optimal Estimator For Multivariate Convex Regression},
  author = {Gil Kur and Eli Putterman},
  journal= {arXiv preprint arXiv:2205.03368},
  year   = {2025}
}

Comments

Minor corrections and improved presentation (appeared at COLT 2022)

R2 v1 2026-06-24T11:09:38.592Z