For a discrete-time finite-alphabet stationary channel $\nu$ satisfying a weak continuity requirement, it is shown that there are capacities $C_s(\nu)$ and $C_b(\nu)$ which have the following operational significance. A Bernoulli source $\mu$ is transmissible over $\nu$ via sliding-block coding if and only if the entropy $H(\mu)$ of $\mu$ is no greater than $C_s(\nu); \mu$ is transmissible via block coding if and only if $H(\mu)$ is no greater than $C_b(\nu)$. The weak continuity requirement is satisfied for the $\bar{d}$-continuous channels of Gray-Ornstein as well as other channels. An example of a channel is given to show that the case $C_s(\nu) \neq C_b(\nu)$ can occur.

Publié le : 1980-10-14
Classification:  Stationary channels,  sliding-block codes,  block codes,  Bernoulli sources,  94A15

@article{1176994623,
     author = {Kieffer, John C.},
     title = {On the Transmission of Bernoulli Sources Over Stationary Channels},
     journal = {Ann. Probab.},
     volume = {8},
     number = {6},
     year = {1980},
     pages = { 942-961},
     language = {en},
     url = {http://dml.mathdoc.fr/item/1176994623}
}

Kieffer, John C. On the Transmission of Bernoulli Sources Over Stationary Channels. Ann. Probab., Tome 8 (1980) no. 6, pp.  942-961. http://gdmltest.u-ga.fr/item/1176994623/