English

Private measures, random walks, and synthetic data

Cryptography and Security 2024-03-26 v2 Probability Statistics Theory Statistics Theory

Abstract

Differential privacy is a mathematical concept that provides an information-theoretic security guarantee. While differential privacy has emerged as a de facto standard for guaranteeing privacy in data sharing, the known mechanisms to achieve it come with some serious limitations. Utility guarantees are usually provided only for a fixed, a priori specified set of queries. Moreover, there are no utility guarantees for more complex - but very common - machine learning tasks such as clustering or classification. In this paper we overcome some of these limitations. Working with metric privacy, a powerful generalization of differential privacy, we develop a polynomial-time algorithm that creates a private measure from a data set. This private measure allows us to efficiently construct private synthetic data that are accurate for a wide range of statistical analysis tools. Moreover, we prove an asymptotically sharp min-max result for private measures and synthetic data for general compact metric spaces. A key ingredient in our construction is a new superregular random walk, whose joint distribution of steps is as regular as that of independent random variables, yet which deviates from the origin logarithmicaly slowly.

Keywords

Cite

@article{arxiv.2204.09167,
  title  = {Private measures, random walks, and synthetic data},
  author = {March Boedihardjo and Thomas Strohmer and Roman Vershynin},
  journal= {arXiv preprint arXiv:2204.09167},
  year   = {2024}
}
R2 v1 2026-06-24T10:52:41.169Z