Multi-Pass Streaming Lower Bounds for Uniformity Testing
Abstract
We prove multi-pass streaming lower bounds for uniformity testing over a domain of size 2m. The tester receives a stream of n i.i.d. samples and must distinguish (i) the uniform distribution on [2m] from (ii) a Paninski-style planted distribution in which, for each pair (2i-1,2i), the probabilities are biased left or right by ε/2m. We show that any -pass streaming algorithm using space s and achieving constant advantage must satisfy the tradeoff sn=(m/ε2). This extends the one-pass lower bound of Diakonikolas, Gouleakis, Kane, and Rao (2019) to multiple passes. Our proof has two components. First, we develop a hybrid argument, inspired by Dinur (2020), that reduces streaming to two-player communication problems. This reduction relies on a new perspective on hardness: we identify the source of hardness as uncertainty in the bias directions, rather than the collision locations. Second, we prove a strong lower bound for a basic two-player communication task, in which Alice and Bob must decide whether two random sign vectors Ya,Yb∈\ 1\m are independent or identical, yet they cannot observe the signs directly--only noisy local views of each coordinate. Our techniques may be of independent use for other streaming problems with stochastic inputs.
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