Lightweight Protocols for Distributed Private Quantile Estimation

Abstract

Distributed data analysis is a large and growing field driven by a massive proliferation of user devices, and by privacy concerns surrounding the centralised storage of data. We consider two adaptive algorithms for estimating one quantile (e.g.~the median) when each user holds a single data point lying in a domain [B] that can be queried once through a private mechanism; one under local differential privacy (LDP) and another for shuffle differential privacy (shuffle-DP). In the adaptive setting we present an -LDP algorithm which can estimate any quantile within error α only requiring O( B2α2) users, and an (,δ)-shuffle DP algorithm requiring only O((12+1α2) B) users. Prior (nonadaptive) algorithms require more users by several logarithmic factors in B. We further provide a matching lower bound for adaptive protocols, showing that our LDP algorithm is optimal in the low- regime. Additionally, we establish lower bounds against non-adaptive protocols which paired with our understanding of the adaptive case, proves a fundamental separation between these models.

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