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|Title:||Advantage of a quantum player over a classical one in 2X2 quantum games|
|Citation:||Proceedings of the Royal Society of London Series A-Mathematical Physical and Engineering Sciences, 2003; 459(2038):2463-2474|
|Publisher:||Royal Soc London|
|Adrian P. Flitney and Derek Abbott|
|Abstract:||We study a general 2x2 symmetric entangled quantum game. When one player has access only to classical strategies, while the other can use the full range of quantum strategies, there are `miracle’ moves available to the quantum player that can direct the game towards the quantum player’s preferred result regardless of the classical player’s strategy. The advantage pertaining to the quantum player is dependent on the degree of entanglement. Below a critical level, dependent on the pay-offs in the game, the miracle move is of no advantage.|
|Keywords:||quantum games; game theory; degree of entanglement; entanglement thresholds|
|Rights:||© 2003 The Royal Society|
|Appears in Collections:||Electrical and Electronic Engineering publications|
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