Exponential Quantum-Classical Gaps in Multiparty Nondeterministic Communication Complexity

Abstract

There are three different types of nondeterminism in quantum communication: i) -communication, ii) -communication, and iii) -communication. In this paper we show that multiparty -communication can be exponentially stronger than -communication. This also implies an exponential separation with respect to classical multiparty nondeterministic communication complexity. We argue that there exists a total function that is hard for -communication and easy for -communication. The proof of it involves an application of the pattern tensor method and a new lower bound for polynomial threshold degree. Another important consequence of this result is that nondeterministic rank can be exponentially lower than the discrepancy bound.