Efficient quantum protocols for XOR functions

Abstract

We show that for any Boolean function f on 0,1n, the bounded-error quantum communication complexity of XOR functions f satisfies that Qε(f ) = O(2d (\| f\|1,ε + nε) (1/ε)), where d is the F2-degree of f, and \| f\|1,ε = g:\|f-g\|∞ ≤ ε \| f\|1. This implies that the previous lower bound Qε(f ) = (\| f\|1,ε) by Lee and Shraibman LS09 is tight for f with low F2-degree. The result also confirms the quantum version of the Log-rank Conjecture for low-degree XOR functions. In addition, we show that the exact quantum communication complexity satisfies QE(f) = O(2d \| f\|0), where \| f\|0 is the number of nonzero Fourier coefficients of f. This matches the previous lower bound QE(f(x,y)) = ( rank(Mf)) by Buhrman and de Wolf BdW01 for low-degree XOR functions.