Separation Between Deterministic and Randomized Query Complexity
SIAM JOURNAL ON COMPUTING(2018)
摘要
Saks and Wigderson 27th FOGS, IEEE Computer Society, as Alamitos, CA, 1986, pp. 29-38] conjectured that R-0(f) = Omega (D(f)(0.753...)) for all Boolean functions f, here R-0 denotes the randomized complexity and D denotes 10 determinist is query CCATI p1exit;,yr. We,show t hat for the pointer function GPW(rxs) defined by Goos. Pitassi, arid Watson [in Proceedings of the 56th FOCS, IEEE, Piscataway, NJ, 2015, pp. 1077-1088] the following hold: s) s) and (b) R-1(GPW(rxs)) = Irs), cyhere R1 denotes the randomized one-sided error query complexity. These results imply that (i) R-0(GPW(s2xs)) = O(D(GPW(s2xs))2/3) t hereby refuting the; conjecture of Saks and Wigdorson, and (ii) R-1 (GPW(sxs))- O(R-0(GPW(sxs))(2/3)), thereby providing a polynomial separation between the randomized zero -error and one-sided error query complexity measures.
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关键词
deterministic decision tree,randomized decision tree,query complexity,models of computation
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