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We solve an open problem in communication complexity posed by Kushilevitz and Nisan (1997). Let Repsiv(f) and Dmu epsiv(f) denote the randomized and mu-distributional communication complexities off, respectively (e a small constant). Yao's well-known minimax principle states that Repsiv(f) = maxmu{Dmu epsiv(f)}. Kushilevitz and Nisan (1997) ask whether this equality is approximately preserved if the maximization is taken over product distributions only, rather than all distributions mu. We give a strong negative answer to this question. Specifically, we prove the existence of a function f : {0,1}n X {0,1}n rarr {0, 1}for which Repsiv(f) = Omega(n) but maxmuproduct {Dmu epsiv(f)} = 0(1).
Published in:
Computational Complexity, 2008. CCC '08. 23rd Annual IEEE Conference on
Date of Conference: 23-26 June 2008
- Page(s):
- 64 - 70
- ISSN :
- 1093-0159
- Print ISBN:
- 978-0-7695-3169-4
- INSPEC Accession Number:
- 10074094
- Conference Location :
- College Park, MD
- Digital Object Identifier :
- 10.1109/CCC.2008.10
- Product Type:
- Conference Publications
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