DocumentCode :
910441
Title :
Approximating discrete probability distributions with dependence trees
Author :
Chow, C.K. ; Liu, C.N.
Volume :
14
Issue :
3
fYear :
1968
fDate :
5/1/1968 12:00:00 AM
Firstpage :
462
Lastpage :
467
Abstract :
A method is presented to approximate optimally an 
-dimensional discrete probability distribution by a product of second-order distributions, or the distribution of the first-order tree dependence. The problem is to find an optimum set of 
first order dependence relationship among the variables. It is shown that the procedure derived in this paper yields an approximation of a minimum difference in information. It is further shown that when this procedure is applied to empirical observations from an unknown distribution of tree dependence, the procedure is the maximum-likelihood estimate of the distribution.
-dimensional discrete probability distribution by a product of second-order distributions, or the distribution of the first-order tree dependence. The problem is to find an optimum set of first order dependence relationship among the variables. It is shown that the procedure derived in this paper yields an approximation of a minimum difference in information. It is further shown that when this procedure is applied to empirical observations from an unknown distribution of tree dependence, the procedure is the maximum-likelihood estimate of the distribution.Keywords :
Approximation methods; Probability functions; Trees; Distribution functions; Information systems; Learning systems; Maximum likelihood estimation; Probability distribution; Random variables;
fLanguage :
English
Journal_Title :
Information Theory, IEEE Transactions on
Publisher :
ieee
ISSN :
0018-9448
Type :
jour
DOI :
10.1109/TIT.1968.1054142
Filename :
1054142
Link To Document :
