Information Bottleneck on General Alphabets

Abstract

We prove rigorously a source coding theorem that can probably be considered folklore, a generalization to arbitrary alphabets of a problem motivated by the Information Bottleneck method. For general random variables (Y, X), we show essentially that for some n ∈ N, a function f with rate limit |f| nR and I(Yn; f(Xn)) nS exists if and only if there is a random variable U such that the Markov chain Y - X - U holds, I(U; X) R and I(U; Y) S. The proof relies on the well established discrete case and showcases a technique for lifting discrete coding theorems to arbitrary alphabets.