Litcius/Paper detail

Private Mean Estimation of Heavy-Tailed Distributions

Gautam Kamath, Vikrant Singhal, Jonathan Ullman

2020Conference on Learning Theory19 citations

Abstract

We give new upper and lower bounds on the minimax sample complexity of differentially private mean estimation of distributions with bounded $k$-th moments. Roughly speaking, in the univariate case, we show that $$n = \Theta\left(\frac{1}{\alpha^2} + \frac{1}{\alpha^{\frac{k}{k-1}}\varepsilon}\right)$$ samples are necessary and sufficient to estimate the mean to $\alpha$-accuracy under $\varepsilon$-differential privacy, or any of its common relaxations. This result demonstrates a qualitatively different behavior compared to estimation absent privacy constraints, for which the sample complexity is identical for all $k \geq 2$. We also give algorithms for the multivariate setting whose sample complexity is a factor of $O(d)$ larger than the univariate case.

Topics & Concepts

UnivariateSample complexityBounded functionMinimaxCombinatoricsMathematicsDifferential privacySample mean and sample covarianceUpper and lower boundsMultivariate statisticsSample (material)EstimationDiscrete mathematicsStatisticsMathematical analysisComputer scienceMathematical optimizationPhysicsEstimatorArtificial intelligenceEconomicsThermodynamicsManagementPrivacy-Preserving Technologies in DataCryptography and Data SecurityProbability and Risk Models