Sequential Necessary and Sufficient Conditions for Capacity Achieving Distributions of Channels with Memory and Feedback

Abstract

We derive sequential necessary and sufficient conditions for any channel input conditional distribution P0,n\PXt|Xt-1,Yt-1:~t=0,…,n\ to maximize the finite-time horizon directed information defined by CFBXn → Yn P0,n I(Xn→Yn),~~~ I(Xn → Yn) =Σt=0nI(Xt;Yt|Yt-1) for channel distributions \PYt|Yt-1,Xt:~t=0,…,n\ and \PYt|Yt-Mt-1,Xt:~t=0,…,n\, where Yt\Y0,…,Yt\ and Xt\X0,…,Xt\ are the channel input and output random processes, and M is a finite nonnegative integer. We apply the necessary and sufficient conditions to application examples of time-varying channels with memory and we derive recursive closed form expressions of the optimal distributions, which maximize the finite-time horizon directed information. Further, we derive the feedback capacity from the asymptotic properties of the optimal distributions by investigating the limit CX∞ → Y∞FB n ∞ 1n+1 CXn → YnFB without any \'a priori assumptions, such as, stationarity, ergodicity or irreducibility of the channel distribution. The necessary and sufficient conditions can be easily extended to a variety of channels with memory, beyond the ones considered in this paper.