Exponential Separation of Quantum and Classical One-Way Numbers-on-Forehead Communication
Abstract
Numbers-on-Forehead (NOF) communication model is a central model in communication complexity. As a restricted variant, one-way NOF model is of particular interest. Establishing strong one-way NOF lower bounds would imply circuit lower bounds, resolve well-known problems in additive combinatorics, and yield wide-ranging applications in areas such as cryptography and distributed computing. However, proving strong lower bounds in one-way NOF communication remains highly challenging; many fundamental questions in one-way NOF communication remain wide open. One of the fundamental questions, proposed by Gavinsky and Pudl\'ak (CCC 2008), is to establish an explicit exponential separation between quantum and classical one-way NOF communication. In this paper, we resolve this open problem by establishing the first exponential separation between quantum and randomized communication complexity in one-way NOF model. Specifically, we define a lifted variant of the Hidden Matching problem of Bar-Yossef, Jayram, and Kerenidis (STOC 2004) and show that it admits an (O( n))-cost quantum protocol in the one-way NOF setting. By contrast, we prove that any k-party one-way randomized protocol for this problem requires communication (n1/32k/3). Notably, our separation applies even to a generalization of k-player one-way communication, where the first player speaks once, and all other k-1 players can communicate freely.
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