English

Learning the score under shape constraints

Statistics Theory 2025-12-17 v1 Machine Learning Statistics Theory

Abstract

Score estimation has recently emerged as a key modern statistical challenge, due to its pivotal role in generative modelling via diffusion models. Moreover, it is an essential ingredient in a new approach to linear regression via convex MM-estimation, where the corresponding error densities are projected onto the log-concave class. Motivated by these applications, we study the minimax risk of score estimation with respect to squared L2(P0)L^2(P_0)-loss, where P0P_0 denotes an underlying log-concave distribution on R\mathbb{R}. Such distributions have decreasing score functions, but on its own, this shape constraint is insufficient to guarantee a finite minimax risk. We therefore define subclasses of log-concave densities that capture two fundamental aspects of the estimation problem. First, we establish the crucial impact of tail behaviour on score estimation by determining the minimax rate over a class of log-concave densities whose score function exhibits controlled growth relative to the quantile levels. Second, we explore the interplay between smoothness and log-concavity by considering the class of log-concave densities with a scale restriction and a (β,L)(\beta,L)-H\"older assumption on the log-density for some β[1,2]\beta \in [1,2]. We show that the minimax risk over this latter class is of order L2/(2β+1)nβ/(2β+1)L^{2/(2\beta+1)}n^{-\beta/(2\beta+1)} up to poly-logarithmic factors, where nn denotes the sample size. When β<2\beta < 2, this rate is faster than could be obtained under either the shape constraint or the smoothness assumption alone. Our upper bounds are attained by a locally adaptive, multiscale estimator constructed from a uniform confidence band for the score function. This study highlights intriguing differences between the score estimation and density estimation problems over this shape-constrained class.

Keywords

Cite

@article{arxiv.2512.14624,
  title  = {Learning the score under shape constraints},
  author = {Rebecca M. Lewis and Oliver Y. Feng and Henry W. J. Reeve and Min Xu and Richard J. Samworth},
  journal= {arXiv preprint arXiv:2512.14624},
  year   = {2025}
}

Comments

70 pages, 5 figures

R2 v1 2026-07-01T08:27:44.494Z