DocumentCode :
925691
Title :
The zero-error side information problem and chromatic numbers (Corresp.)
Author :
Witsenhausen, H.S.
Volume :
22
Issue :
5
fYear :
1976
fDate :
9/1/1976 12:00:00 AM
Firstpage :
592
Lastpage :
593
Abstract :
A discrete random variable 
is to be transmitted by means of a discrete signal. The receiver has prior knowledge of a discrete random variable 
jointly distributed with . The probability of error must be exactly zero, and the problem is to minimize the signal\´s alphabet size. In the case where the transmitter also has access to the value of , the problem is trivial and no advantage can be obtained by block coding over independent repetitions. If, however, is not known at the transmitter then the problem is equivalent to the chromatic number problem for graphs, and block coding may produce savings.
is to be transmitted by means of a discrete signal. The receiver has prior knowledge of a discrete random variable jointly distributed with . The probability of error must be exactly zero, and the problem is to minimize the signal\´s alphabet size. In the case where the transmitter also has access to the value of , the problem is trivial and no advantage can be obtained by block coding over independent repetitions. If, however, is not known at the transmitter then the problem is equivalent to the chromatic number problem for graphs, and block coding may produce savings.Keywords :
Graph theory; Source coding; Bipartite graph; Block codes; Data mining; Feature extraction; Gaussian noise; Matched filters; Random variables; Signal detection; Statistics; Transmitters;
fLanguage :
English
Journal_Title :
Information Theory, IEEE Transactions on
Publisher :
ieee
ISSN :
0018-9448
Type :
jour
DOI :
10.1109/TIT.1976.1055607
Filename :
1055607
Link To Document :
