On the Power of Multiplexing in Number-on-the-Forehead Protocols

Abstract

We study the direct-sum problem for k-party ``Number On the Forehead'' (NOF) deterministic communication complexity. We prove several positive results, showing that the complexity of computing a function f in this model, on instances, may be significantly cheaper than times the complexity of computing f on a single instance. Quite surprisingly, we show that this is the case for ``most'' (boolean, k-argument) functions. We then formalize two-types of sufficient conditions on a NOF protocol Q, for a single instance, each of which guarantees some communication complexity savings when appropriately extending Q to work on instances. One such condition refers to what each party needs to know about inputs of the other parties, and the other condition, additionally, refers to the communication pattern that the single-instance protocol Q uses. In both cases, the tool that we use is ``multiplexing'': we combine messages sent in parallel executions of protocols for a single instance, into a single message for the multi-instance (direct-sum) case, by xoring them with each other.