A Fast Algorithm for Adaptive Private Mean Estimation

Abstract

We design an (, δ)-differentially private algorithm to estimate the mean of a d-variate distribution, with unknown covariance , that is adaptive to . To within polylogarithmic factors, the estimator achieves optimal rates of convergence with respect to the induced Mahalanobis norm ||·||, takes time O(n d2) to compute, has near linear sample complexity for sub-Gaussian distributions, allows to be degenerate or low rank, and adaptively extends beyond sub-Gaussianity. Prior to this work, other methods required exponential computation time or the superlinear scaling n = (d3/2) to achieve non-trivial error with respect to the norm ||·||.