English

Privately Learning Smooth Distributions on the Hypercube by Projections

Statistics Theory 2024-09-17 v1 Statistics Theory

Abstract

Fueled by the ever-increasing need for statistics that guarantee the privacy of their training sets, this article studies the centrally-private estimation of Sobolev-smooth densities of probability over the hypercube in dimension d. The contributions of this article are two-fold : Firstly, it generalizes the one dimensional results of (Lalanne et al., 2023) to non-integer levels of smoothness and to a high-dimensional setting, which is important for two reasons : it is more suited for modern learning tasks, and it allows understanding the relations between privacy, dimensionality and smoothness, which is a central question with differential privacy. Secondly, this article presents a private strategy of estimation that is data-driven (usually referred to as adaptive in Statistics) in order to privately choose an estimator that achieves a good bias-variance trade-off among a finite family of private projection estimators without prior knowledge of the ground-truth smoothness β\beta. This is achieved by adapting the Lepskii method for private selection, by adding a new penalization term that makes the estimation privacy-aware.

Keywords

Cite

@article{arxiv.2409.10083,
  title  = {Privately Learning Smooth Distributions on the Hypercube by Projections},
  author = {Clément Lalanne and Sébastien Gadat},
  journal= {arXiv preprint arXiv:2409.10083},
  year   = {2024}
}
R2 v1 2026-06-28T18:45:47.110Z