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Lower Bounds for Locally Private Estimation via Communication Complexity

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arxiv 1902.00582 v4 pith:HODGAB5R submitted 2019-02-01 math.ST stat.TH

Lower Bounds for Locally Private Estimation via Communication Complexity

classification math.ST stat.TH
keywords privacyestimationboundsdifferentiallowervarepsilonfraclevels
verification ladder T0 review T1 audit T2 compute T3 formal T4 reserved
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We develop lower bounds for estimation under local privacy constraints---including differential privacy and its relaxations to approximate or R\'{e}nyi differential privacy---by showing an equivalence between private estimation and communication-restricted estimation problems. Our results apply to arbitrarily interactive privacy mechanisms, and they also give sharp lower bounds for all levels of differential privacy protections, that is, privacy mechanisms with privacy levels $\varepsilon \in [0, \infty)$. As a particular consequence of our results, we show that the minimax mean-squared error for estimating the mean of a bounded or Gaussian random vector in $d$ dimensions scales as $\frac{d}{n} \cdot \frac{d}{ \min\{\varepsilon, \varepsilon^2\}}$.

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