Lifting randomized query complexity to randomized communication complexity

Abstract

We show that for a relation f⊂eq \0,1\n× O and a function g:\0,1\m× \0,1\m → \0,1\ (with m= O( n)), R1/3(f gn) = (R1/3(f) · (1disc(Mg) - O( n))), where f gn represents the composition of f and gn, Mg is the sign matrix for g, disc(Mg) is the discrepancy of Mg under the uniform distribution and R1/3(f) (R1/3(f gn)) denotes the randomized query complexity of f (randomized communication complexity of f gn) with worst case error 13. In particular, this implies that for a relation f⊂eq \0,1\n× O, R1/3(f IPmn) = (R1/3(f) · m), where IPm:\0,1\m× \0,1\m→ \0,1\ is the Inner Product (modulo 2) function and m= O((n)).