Statistical physics approaches to Unique Games

November 04, 2019 Β· Declared Dead Β· πŸ› Cybersecurity and Cyberforensics Conference

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Authors Matthew Coulson, Ewan Davies, Alexandra Kolla, Viresh Patel, Guus Regts arXiv ID 1911.01504 Category cs.DS: Data Structures & Algorithms Cross-listed cs.CC, cs.DM, math.CO Citations 13 Venue Cybersecurity and Cyberforensics Conference Last Checked 3 months ago
Abstract
We show how two techniques from statistical physics can be adapted to solve a variant of the notorious Unique Games problem, potentially opening new avenues towards the Unique Games Conjecture. The variant, which we call Count Unique Games, is a promise problem in which the "yes" case guarantees a certain number of highly satisfiable assignments to the Unique Games instance. In the standard Unique Games problem, the "yes" case only guarantees at least one such assignment. We exhibit efficient algorithms for Count Unique Games based on approximating a suitable partition function for the Unique Games instance via (i) a zero-free region and polynomial interpolation, and (ii) the cluster expansion. We also show that a modest improvement to the parameters for which we give results would refute the Unique Games Conjecture.
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