Zero-error communication over adder MAC

Abstract

Adder MAC is a simple noiseless multiple-access channel (MAC), where if users send messages X1,…,Xh∈ \0,1\n, then the receiver receives Y = X1+·s+Xh with addition over Z. Communication over the noiseless adder MAC has been studied for more than fifty years. There are two models of particular interest: uniquely decodable code tuples, and Bh-codes. In spite of the similarities between these two models, lower bounds and upper bounds of the optimal sum rate of uniquely decodable code tuple asymptotically match as number of users goes to infinity, while there is a gap of factor two between lower bounds and upper bounds of the optimal rate of Bh-codes. The best currently known Bh-codes for h 3 are constructed using random coding. In this work, we study variants of the random coding method and related problems, in hope of achieving Bh-codes with better rate. Our contribution include the following. (1) We prove that changing the underlying distribution used in random coding cannot improve the rate. (2) We determine the rate of a list-decoding version of Bh-codes achieved by the random coding method. (3) We study several related problems about R\'enyi entropy.