论文信息 - On error exponents for arbitrarily varying channels

On error exponents for arbitrarily varying channels

The minimum probability of error achievable by random codes on the arbitrarily varying channel (AVC) is investigated. New exponential error bounds are found and applied to the AVC with and without input and state constraints. Also considered is a simple subclass of random codes, called randomly modulated codes, in which encoding and decoding operations are separate from code randomization. A universal coding theorem is proved which shows the existence of randomly modulated codes that achieve the same error bounds as "fully" random codes for all AVCs.

Brian L. Hughes | Tony G. Thomas | B. Hughes | Tony G. Thomas

[1] R. Ahlswede. Elimination of correlation in random codes for arbitrarily varying channels , 1978 .

[2] Irvin G. Stiglitz,et al. Coding for a class of unknown channels , 1966, IEEE Trans. Inf. Theory.

[3] D. Blackwell,et al. The Capacities of Certain Channel Classes Under Random Coding , 1960 .

[4] Imre Csiszár,et al. The capacity of the arbitrarily varying channel revisited: Positivity, constraints , 1988, IEEE Trans. Inf. Theory.

[5] Thomas H. E. Ericson,et al. Exponential error bounds for random codes in the arbitrarily varying channel , 1985, IEEE Trans. Inf. Theory.

[6] RUDOLF AHLSWEDE. Arbitrarily varying channels with states sequence known to the sender , 1986, IEEE Trans. Inf. Theory.

[7] Imre Csiszár,et al. Arbitrarily varying channels with constrained inputs and states , 1988, IEEE Trans. Inf. Theory.