A three-player coherent state embezzlement game
Abstract
We introduce a three-player nonlocal game, with a finite number of classical questions and answers, such that the optimal success probability of in the game can only be achieved in the limit of strategies using arbitrarily high-dimensional entangled states. Precisely, there exists a constant such that to succeed with probability in the game it is necessary to use an entangled state of at least qubits, and it is sufficient to use a state of at most qubits. The game is based on the coherent state exchange game of Leung et al. (CJTCS 2013). In our game, the task of the quantum verifier is delegated to a third player by a classical referee. Our results complement those of Slofstra (arXiv:1703.08618) and Dykema et al. (arXiv:1709.05032), who obtained two-player games with similar (though quantitatively weaker) properties based on the representation theory of finitely presented groups and -algebras respectively.
Cite
@article{arxiv.1802.04926,
title = {A three-player coherent state embezzlement game},
author = {Zhengfeng Ji and Debbie Leung and Thomas Vidick},
journal= {arXiv preprint arXiv:1802.04926},
year = {2020}
}
Comments
Version published in Quantum