We use the standard three-party Einstein-Podolsky-Rosen (EPR) setting in order to play general three-player non-cooperative symmetric games.
We analyze how the peculiar non-factorizable joint probabilities that may
emerge in the EPR setting can change outcome of the game. Our setup
requires that the quantum game attains classical interpretation for factor-
izable joint probabilities. We analyze the generalized three-player game
of Prisoner's Dilemma (PD) and show that the players can indeed escape
from the classical outcome of the game because of non-factorizable joint
probabilities. This result for three-player PD contrasts strikingly with our
earlier result for two-player PD for which even non-factorizable joint prob-
abilities are not found to be helpful to escape from the classical outcome
of the game.
Access to the requested content is limited to institutions that have purchased or subscribe to SPIE eBooks.
You are receiving this notice because your organization may not have SPIE eBooks access.*
*Shibboleth/Open Athens users─please
sign in
to access your institution's subscriptions.
To obtain this item, you may purchase the complete book in print or electronic format on
SPIE.org.
INSTITUTIONAL Select your institution to access the SPIE Digital Library.
PERSONAL Sign in with your SPIE account to access your personal subscriptions or to use specific features such as save to my library, sign up for alerts, save searches, etc.