Near-optimal algorithms for private estimation and sequential testing of collision probability

Abstract

We present new algorithms for estimating and testing collision probability, a fundamental measure of the spread of a discrete distribution that is widely used in many scientific fields. We describe an algorithm that satisfies (α, β)-local differential privacy and estimates collision probability with error at most ε using O((1/β)α2 ε2) samples for α 1, which improves over previous work by a factor of 1α2. We also present a sequential testing algorithm for collision probability, which can distinguish between collision probability values that are separated by ε using O(1ε2) samples, even when ε is unknown. Our algorithms have nearly the optimal sample complexity, and in experiments we show that they require significantly fewer samples than previous methods.

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