A Coding Theorem for a Class of Stationary Channels with Feedback
Abstract
A coding theorem is proved for a class of stationary channels with feedback in which the output Yn = f(Xn-mn, Zn-mn) is the function of the current and past m symbols from the channel input Xn and the stationary ergodic channel noise Zn. In particular, it is shown that the feedback capacity is equal to n∞ p(xn||yn-1) 1n I(Xn Yn), where I(Xn Yn) = Σi=1n I(Xi; Yi|Yi-1) denotes the Massey directed information from the channel input to the output, and the supremum is taken over all causally conditioned distributions p(xn||yn-1) = Πi=1n p(xi|xi-1,yi-1). The main ideas of the proof are the Shannon strategy for coding with side information and a new elementary coding technique for the given channel model without feedback, which is in a sense dual to Gallager's lossy coding of stationary ergodic sources. A similar approach gives a simple alternative proof of coding theorems for finite state channels by Yang-Kavcic-Tatikonda, Chen-Berger, and Permuter-Weissman-Goldsmith.
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