A parallel repetition theorem for entangled two-player one-round games under product distributions
Abstract
We show a parallel repetition theorem for the entangled value ω*(G) of any two-player one-round game G where the questions (x,y) ∈ X×Y to Alice and Bob are drawn from a product distribution on X×Y. We show that for the k-fold product Gk of the game G (which represents the game G played in parallel k times independently), ω*(Gk) =(1-(1-ω*(G))3)(k(|A| · |B|)) , where A and B represent the sets from which the answers of Alice and Bob are drawn.
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