Abstract.
We consider the
analog of the P versus NP \cap co-NP question for the classical
two-party communication protocols where polynomial time is replaced by
poly-logarithmic communication: if both a boolean function f and its
negation \neg f have small (poly-logarithmic in the number of
variables) nondeterministic communication complexity, what is then its
deterministic and/or probabilistic communication complexity?
In the
\emph{fixed} (worst) partition model of communication this
question was answered by Aho, Ullman and Yannakakis in 1983: here
P = NP\cap co-NP.