On the Power of Many One-Bit Provers

Abstract

We study the class of languages, denoted by [k, 1-ε, s], which have k-prover games where each prover just sends a single bit, with completeness 1-ε and soundness error s. For the case that k=1 (i.e., for the case of interactive proofs), Goldreich, Vadhan and Wigderson ( Computational Complexity'02) demonstrate that exactly characterizes languages having 1-bit proof systems with"non-trivial" soundness (i.e., 1/2 < s ≤ 1-2ε). We demonstrate that for the case that k≥ 2, 1-bit k-prover games exhibit a significantly richer structure: + (Folklore) When s ≤ 12k - ε, [k, 1-ε, s] = ; + When 12k + ε ≤ s < 22k-ε, [k, 1-ε, s] = ; + When s 22k + ε, ⊂eq [k, 1-ε, s]; + For s 0.62 k/2k and sufficiently large k, [k, 1-ε, s] ⊂eq ; + For s 2k/2k, [k, 1, 1-ε, s] = . As such, 1-bit k-prover games yield a natural "quantitative" approach to relating complexity classes such as ,,, , and . We leave open the question of whether a more fine-grained hierarchy (between and ) can be established for the case when s ≥ 22k + ε.