Polynomial Bounds On Parallel Repetition For All 3-Player Games With Binary Inputs
Abstract
We prove that for every 3-player (3-prover) game with value less than one, whose query distribution has the support of hamming weight one vectors, the value of the -fold parallel repetition decays polynomially fast to zero; that is, there is a constant such that the value of the game is at most . Following the recent work of Girish, Holmgren, Mittal, Raz and Zhan (STOC 2022), our result is the missing piece that implies a similar bound for a much more general class of multiplayer games: For 3-player game over and , with value less than 1, there is a constant such that the value of the game is at most . Our proof technique is new and requires many new ideas. For example, we make use of the Level- inequalities from Boolean Fourier Analysis, which, to the best of our knowledge, have not been explored in this context prior to our work.
Cite
@article{arxiv.2204.00858,
title = {Polynomial Bounds On Parallel Repetition For All 3-Player Games With Binary Inputs},
author = {Uma Girish and Kunal Mittal and Ran Raz and Wei Zhan},
journal= {arXiv preprint arXiv:2204.00858},
year = {2022}
}