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We propose a (epsilon, delta)-differentially private mechanism that, given an input graph G with n vertices and m edges, in polynomial time generates a synthetic graph G' approximating all cuts of the input graph up to an additive error of O (root mn/epsilon log(2) (n/delta)). This is the first construction of differentially private cut approximator that allows additive error o(m) for all m > nlog(C) n. The best known previous results gave additive O(n(3/2)) error and hence only retained information about the cut structure on very dense graphs. Thus, we are making a notable progress on a promiment problem in differential privacy. We also present lower bounds showing that our utility/privacy tradeoff is essentially the best possible if one seeks to get purely additive cut approximations.
Karl Aberer, Thành Tâm Nguyên, Chi Thang Duong
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