A note on a problem in communication complexity

Abstract

In this note, we prove a version of Tarui's Theorem in communication complexity, namely PHcc ⊂eq BP· PPcc. Consequently, every measure for PPcc leads to a measure for PHcc, subsuming a result of Linial and Shraibman that problems with high mc-rigidity lie outside the polynomial hierarchy. By slightly changing the definition of mc-rigidity (arbitrary instead of uniform distribution), it is then evident that the class Mcc of problems with low mc-rigidity equals BP· PPcc. As BP· PPcc ⊂eq PSPACEcc, this rules out the possibility, that had been left open, that even polynomial space is contained in Mcc.