On symmetric nonlocal games

Andris Ambainis; Dmitry Kravchenko; Nikolay Nahimov; Alexander Rivosh; Madars Virza

doi:10.1016/j.tcs.2013.03.011

On symmetric nonlocal games

Andris Ambainis
, Dmitry Kravchenko^*
, Nikolay Nahimov
, Alexander Rivosh
, Madars Virza

^*Corresponding author for this work

University of Latvia

Research output: Contribution to journal › Article › peer-review

1 Citation (Scopus)

Abstract

Nonlocal games are used to display differences between the classical and quantum world. In this paper, we study symmetric XOR games, which form an important subset of nonlocal games. We give simple methods for calculating the classical and the quantum values for symmetric XOR games with one-bit input per player. We illustrate those methods with two examples. One example is an N-player game (due to Ardehali (1992) [3]) that provides the maximum quantum-over-classical advantage. The second example comes from generalization of CHSH game by letting the referee to choose arbitrary symmetric distribution of players' inputs.

Original language	English
Pages (from-to)	36-48
Number of pages	13
Journal	Theoretical Computer Science
Volume	494
DOIs	https://doi.org/10.1016/j.tcs.2013.03.011
Publication status	Published - 8 Jul 2013

Keywords

CHSH game
Mermin-Ardehali game
Quantum games
Symmetric nonlocal games

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10.1016/j.tcs.2013.03.011

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title = "On symmetric nonlocal games",

abstract = "Nonlocal games are used to display differences between the classical and quantum world. In this paper, we study symmetric XOR games, which form an important subset of nonlocal games. We give simple methods for calculating the classical and the quantum values for symmetric XOR games with one-bit input per player. We illustrate those methods with two examples. One example is an N-player game (due to Ardehali (1992) [3]) that provides the maximum quantum-over-classical advantage. The second example comes from generalization of CHSH game by letting the referee to choose arbitrary symmetric distribution of players' inputs.",

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author = "Andris Ambainis and Dmitry Kravchenko and Nikolay Nahimov and Alexander Rivosh and Madars Virza",

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AU - Ambainis, Andris

AU - Kravchenko, Dmitry

AU - Nahimov, Nikolay

AU - Rivosh, Alexander

AU - Virza, Madars

PY - 2013/7/8

Y1 - 2013/7/8

N2 - Nonlocal games are used to display differences between the classical and quantum world. In this paper, we study symmetric XOR games, which form an important subset of nonlocal games. We give simple methods for calculating the classical and the quantum values for symmetric XOR games with one-bit input per player. We illustrate those methods with two examples. One example is an N-player game (due to Ardehali (1992) [3]) that provides the maximum quantum-over-classical advantage. The second example comes from generalization of CHSH game by letting the referee to choose arbitrary symmetric distribution of players' inputs.

AB - Nonlocal games are used to display differences between the classical and quantum world. In this paper, we study symmetric XOR games, which form an important subset of nonlocal games. We give simple methods for calculating the classical and the quantum values for symmetric XOR games with one-bit input per player. We illustrate those methods with two examples. One example is an N-player game (due to Ardehali (1992) [3]) that provides the maximum quantum-over-classical advantage. The second example comes from generalization of CHSH game by letting the referee to choose arbitrary symmetric distribution of players' inputs.

KW - CHSH game

KW - Mermin-Ardehali game

KW - Quantum games

KW - Symmetric nonlocal games

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DO - 10.1016/j.tcs.2013.03.011

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SN - 0304-3975

VL - 494

SP - 36

EP - 48

JO - Theoretical Computer Science

JF - Theoretical Computer Science

ER -

On symmetric nonlocal games

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Keywords

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