Information Structures for Feedback Capacity of Channels with Memory and Transmission Cost: Stochastic Optimal Control & Variational Equalities-Part I

Abstract

The Finite Transmission Feedback Information (FTFI) capacity is characterized for any class of channel conditional distributions \ PBi|Bi-1, Ai :i=0, 1, …, n\ and \ PBi|Bi-Mi-1, Ai :i=0, 1, …, n\, where M is the memory of the channel, Bn = \Bj: j=…, 0,1, …, n\ are the channel outputs and An= \Aj: j=…, 0,1, …, n\ are the channel inputs. The characterizations of FTFI capacity, are obtained by first identifying the information structures of the optimal channel input conditional distributions P[0,n] = \ PAi|Ai-1, Bi-1: i=0, …, n\, which maximize directed information. The main theorem states, for any channel with memory M, the optimal channel input conditional distributions occur in the subset satisfying conditional independence P[0,n]= \ PAi|Ai-1, Bi-1= PAi|Bi-Mi-1: i=1, …, n\, and the characterization of FTFI capacity is given by CAn → BnFB, M = P[0,n] Σi=0n I(Ai; Bi|Bi-Mi-1) . The methodology utilizes stochastic optimal control theory and a variational equality of directed information, to derive upper bounds on I(An → Bn), which are achievable over specific subsets of channel input conditional distributions P[0,n], which are characterized by conditional independence. For any of the above classes of channel distributions and transmission cost functions, a direct analogy, in terms of conditional independence, of the characterizations of FTFI capacity and Shannon's capacity formulae of Memoryless Channels is identified.