Frequency Moments in Noisy Streaming and Distributed Data under Mismatch Ambiguity

Abstract

We propose a novel framework for statistical estimation on noisy datasets. Within this framework, we focus on the frequency moments (Fp) problem and demonstrate that it is possible to approximate Fp of the unknown ground-truth dataset using sublinear space in the data stream model and sublinear communication in the coordinator model, provided that the approximation ratio is parameterized by a data-dependent quantity, which we call the Fp-mismatch-ambiguity. We also establish a set of lower bounds, which are tight in terms of the input size. Our results yield several interesting insights: (1) In the data stream model, the Fp problem is inherently more difficult in the noisy setting than in the noiseless one. In particular, while F2 can be approximated in logarithmic space in terms of the input size in the noiseless setting, any algorithm for F2 in the noisy setting requires polynomial space. (2) In the coordinator model, in sharp contrast to the noiseless case, achieving polylogarithmic communication in the input size is generally impossible for Fp under noise. However, when the Fp mismatch ambiguity falls below a certain threshold, it becomes possible to achieve communication that is entirely independent of the input size.

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