Bounds on oblivious multiparty quantum communication complexity
Abstract
The main conceptual contribution of this paper is investigating quantum multiparty communication complexity in the setting where communication is \emph{oblivious}. This requirement, which to our knowledge is satisfied by all quantum multiparty protocols in the literature, means that the communication pattern, and in particular the amount of communication exchanged between each pair of players at each round is fixed \emph{independently of the input} before the execution of the protocol. We show, for a wide class of functions, how to prove strong lower bounds on their oblivious quantum -party communication complexity using lower bounds on their \emph{two-party} communication complexity. We apply this technique to prove tight lower bounds for all symmetric functions with \textsf{AND} gadget, and in particular obtain an optimal lower bound on the oblivious quantum -party communication complexity of the -bit Set-Disjointness function. We also show the tightness of these lower bounds by giving (nearly) matching upper bounds.
Cite
@article{arxiv.2210.15402,
title = {Bounds on oblivious multiparty quantum communication complexity},
author = {François Le Gall and Daiki Suruga},
journal= {arXiv preprint arXiv:2210.15402},
year = {2023}
}
Comments
13 pages, an accepted paper of LATIN 2022