Broadcasting on trees near criticality

Abstract

We revisit the problem of broadcasting on d-ary trees: starting from a Bernoulli(1/2) random variable X0 at a root vertex, each vertex forwards its value across binary symmetric channels BSCδ to d descendants. The goal is to reconstruct X0 given the vector XLh of values of all variables at depth h. It is well known that reconstruction (better than a random guess) is possible as h ∞ if and only if δ < δc(d). In this paper, we study the behavior of the mutual information and the probability of error when δ is slightly subcritical. The innovation of our work is application of the recently introduced "less-noisy" channel comparison techniques. For example, we are able to derive the positive part of the phase transition (reconstructability when δ<δc) using purely information-theoretic ideas. This is in contrast with previous derivations, which explicitly analyze distribution of the Hamming weight of XLh (a so-called Kesten-Stigum bound).