Profile Reconstruction from Private Sketches

Abstract

Given a multiset of n items from D, the profile reconstruction problem is to estimate, for t = 0, 1, …, n, the fraction f[t] of items in D that appear exactly t times. We consider differentially private profile estimation in a distributed, space-constrained setting where we wish to maintain an updatable, private sketch of the multiset that allows us to compute an approximation of f = (f[0], …, f[n]). Using a histogram privatized using discrete Laplace noise, we show how to ``reverse'' the noise, using an approach of Dwork et al.~(ITCS '10). We show how to speed up their LP-based technique from polynomial time to O(d + n n), where d = |D|, and analyze the achievable error in the 1, 2 and ∞ norms. In all cases the dependency of the error on d is O( 1 / d) -- we give an information-theoretic lower bound showing that this dependence on d is asymptotically optimal among all private, updatable sketches for the profile reconstruction problem with a high-probability error guarantee.