English

Private estimation algorithms for stochastic block models and mixture models

Data Structures and Algorithms 2023-11-17 v2 Cryptography and Security Machine Learning Machine Learning

Abstract

We introduce general tools for designing efficient private estimation algorithms, in the high-dimensional settings, whose statistical guarantees almost match those of the best known non-private algorithms. To illustrate our techniques, we consider two problems: recovery of stochastic block models and learning mixtures of spherical Gaussians. For the former, we present the first efficient (ϵ,δ)(\epsilon, \delta)-differentially private algorithm for both weak recovery and exact recovery. Previously known algorithms achieving comparable guarantees required quasi-polynomial time. For the latter, we design an (ϵ,δ)(\epsilon, \delta)-differentially private algorithm that recovers the centers of the kk-mixture when the minimum separation is at least O(k1/tt) O(k^{1/t}\sqrt{t}). For all choices of tt, this algorithm requires sample complexity nkO(1)dO(t)n\geq k^{O(1)}d^{O(t)} and time complexity (nd)O(t)(nd)^{O(t)}. Prior work required minimum separation at least O(k)O(\sqrt{k}) as well as an explicit upper bound on the Euclidean norm of the centers.

Keywords

Cite

@article{arxiv.2301.04822,
  title  = {Private estimation algorithms for stochastic block models and mixture models},
  author = {Hongjie Chen and Vincent Cohen-Addad and Tommaso d'Orsi and Alessandro Epasto and Jacob Imola and David Steurer and Stefan Tiegel},
  journal= {arXiv preprint arXiv:2301.04822},
  year   = {2023}
}
R2 v1 2026-06-28T08:09:55.642Z