Undecidability of approximating the capacity of time-invariant Markoff channel with feedback, and non-existence of linear finite-letter conditional mutual information character
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It is proved that approximating, within an additive constant, the capacity of time-invariant Markoff channels with feedback can be posed as a problem which is undecidacable. Then, a definition for the capacity region, which we call the linear finite-letter conditional mutual information characterization is provided, and it is proved that evaluating the feasibility of achievability of a certain rate for this characterization is a decidable problem if Schanuel's conjecture is true. Thus, assuming Schanuel's conjecture is true, there is no linear finite-letter mutual information characterization for the capacity of a time-invariant Markoff channel with feedback.
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