Direct Product Theorems for Randomized Query Complexity

Abstract

We establish two new direct product theorems for the randomized query complexity of Boolean functions. The first shows that computing n copies of a function f, even with a small success probability of γn, requires (n) times the "maximum distributional" query complexity of f with success parameter γ. This result holds for all success parameters γ, even when γ is very close to 1/2 or to 1. As a result, it unifies and generalizes Drucker's direct product theorem (2012) for γ bounded away from 12 and 1 as well as the strong direct sum theorem of Blais and Brody (2019) for γ≈ 1-1/n. The second establishes a general "list decoding" direct product theorem that captures many different variants of partial computation tasks related to the function fn consisting of n copies of f. Notably, our list decoding direct product theorem yields a new threshold direct product theorem and other new variants such as the labelled-threshold direct product theorem. Both of these direct product theorems are obtained by taking a new approach. Instead of directly analyzing the query complexity of algorithms, we introduce a new measure of complexity of functions that we call "discounted score". We show that this measure satisfies a number of useful structural properties, including tensorization, that make it particularly suitable for the study of direct product questions.

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