A note on the partition bound for one-way classical communication complexity

Abstract

We present a linear program for the one-way version of the partition bound (denoted prt1(f)). We show that it characterizes one-way randomized communication complexity R1(f) with shared randomness of every partial function f:X×Y, i.e., for δ,∈(0,1/2), R1(f) ≥ prt1(f) and R+δ1(f) ≤ prt1(f) + (1/δ). This improves upon the characterization of R1(f) in terms of the rectangle bound (due to Jain and Klauck, 2010) by reducing the additive O((1/δ))-term to (1/δ).