We study the sample complexity of private synthetic data generation over an unbounded sized class of statistical queries, and show that any class that is privately proper PAC learnable admits a private synthetic data generator (perhaps non-efficient). Previous work on synthetic data generators focused on the case that the query class D is finite and obtained sample complexity bounds that scale logarithmically with the size ∣D∣. Here we construct a private synthetic data generator whose sample complexity is independent of the domain size, and we replace finiteness with the assumption that D is privately PAC learnable (a formally weaker task, hence we obtain equivalence between the two tasks).
@article{arxiv.1902.03468,
title = {Synthetic Data Generators: Sequential and Private},
author = {Olivier Bousquet and Roi Livni and Shay Moran},
journal= {arXiv preprint arXiv:1902.03468},
year = {2020}
}