Richard Cleve, Wim van Dam, Michael Nielsen, Alain Tapp
Published 1997-08-11, updated 1998-03-12Version 3
We consider the communication complexity of the binary inner product function in a variation of the two-party scenario where the parties have an a priori supply of particles in an entangled quantum state. We prove linear lower bounds for both exact protocols, as well as for protocols that determine the answer with bounded-error probability. Our proofs employ a novel kind of "quantum" reduction from a quantum information theory problem to the problem of computing the inner product. The communication required for the former problem can then be bounded by an application of Holevo's theorem. We also give a specific example of a probabilistic scenario where entanglement reduces the communication complexity of the inner product function by one bit.
Comments: 14 pages, LaTeX w/ llncs style, no figures, made changes in notation in order to be consistent with other papers. To appear in Proceedings of the 1st NASA International Conference on Quantum Computing and Quantum Communications (Springer-Verlag)
Journal: Lect.Notes Comput.Sci. 1509 (1998) 61-74
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Quantum entanglement and classical separability in NMR computing
Dynamics of quantum entanglement
