Near-Optimal and Explicit Bell Inequality Violations
Abstract
Entangled quantum systems can exhibit correlations that cannot be simulated classically. For historical reasons such correlations are called "Bell inequality violations." We give two new two-player games with Bell inequality violations that are stronger, fully explicit, and arguably simpler than earlier work. The first game is based on the Hidden Matching problem of quantum communication complexity, introduced by Bar-Yossef, Jayram, and Kerenidis. This game can be won with probability 1 by a strategy using a maximally entangled state with local dimension (e.g., EPR-pairs), while we show that the winning probability of any classical strategy differs from by at most . The second game is based on the integrality gap for Unique Games by Khot and Vishnoi and the quantum rounding procedure of Kempe, Regev, and Toner. Here -dimensional entanglement allows the game to be won with probability , while the best winning probability without entanglement is . This near-linear ratio is almost optimal, both in terms of the local dimension of the entangled state, and in terms of the number of possible outputs of the two players.
Cite
@article{arxiv.1012.5043,
title = {Near-Optimal and Explicit Bell Inequality Violations},
author = {Harry Buhrman and Oded Regev and Giannicola Scarpa and Ronald de Wolf},
journal= {arXiv preprint arXiv:1012.5043},
year = {2022}
}
Comments
Published in Theory of Computing, Volume 8 (2012), Article 27; Received: September 15, 2011, Revised: August 31, 2012, Published: December 27, 2012