A Composition Theorem for Randomized Query Complexity
Abstract
Let the randomized query complexity of a relation for error probability ε be denoted by Rε(·). We prove that for any relation f ⊂eq \0,1\n × R and Boolean function g:\0,1\m → \0,1\, R1/3(f gn) = (R4/9(f)· R1/2-1/n4(g)), where f gn is the relation obtained by composing f and g. We also show that R1/3(f (gO( n))n)=( n · R4/9(f) · R1/3(g)), where gO( n) is the function obtained by composing the xor function on O( n) bits and gt.
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