Title
Quantum Arthur-Merlin Games
Publication Date
6-15-2005
Document Type
Article
Abstract
This paper studies quantum Arthur-Merlin games, which are Arthur-Merlin games in which Arthur and Merlin can perform quantum computations and Merlin can send Arthur quantum information. As in the classical case, messages from Arthur to Merlin are restricted to be strings of uniformly generated random bits. It is proved that for one-message quantum Arthur-Merlin games, which correspond to the complexity class QMA, completeness and soundness errors can be reduced exponentially without increasing the length of Merlin's message. Previous constructions for reducing error required a polynomial increase in the length of Merlin's message. Applications of this fact include a proof that logarithmic length quantum certificates yield no increase in power over BQP and a simple proof that QMA is contained in PP. Other facts that are proved include the equivalence of three (or more) message quantum Arthur-Merlin games with ordinary quantum interactive proof systems and some basic properties concerning two-message quantum Arthur-Merlin games.
Publication Title
Computational Complexity
Publisher Policy
post-print (with 12 month embargo)
Recommended Citation
Marriott, Chris and Watrous, John, "Quantum Arthur-Merlin Games" (2005). School of Engineering and Technology Publications. 190.
https://digitalcommons.tacoma.uw.edu/tech_pub/190