Unbounded-error classical and quantum communication complexity
ISAAC'07 Proceedings of the 18th international conference on Algorithms and computation
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We study (unbounded error) probabilistic communication complexity. Our new results include -one way and two complexities differ by at most 1 - certain functions like equality and the verification of Hamming distance have upper bounds that are considerably better than their counterparts in deterministic, nondeterministic, or bounded error probabilistic model - there exists a function which requires /spl Omega/(logn) information transfer. As an application, we prove that a certain language requires /spl Omega/(nlogn) time to be recognized by a 1-tape (unbounded error) probabilistic Turing machine. This bound is optimal. (Previous lower bound results [Yao 1] require acceptance by bounded error computation. We believe that this is the first nontrivial lower bound on the time required by unrestricted probabilistic Turing machines.