A chain graph (CG) is a graph admitting both directed and undirected
edges with (partially) directed cycles forbidden. It generalizes both the
concept of undirected graph (UG) and the concept of directed acyclic graph
(DAG). A chain graph can be used to describe efficiently the conditional
independence structure of a multidimensional discrete probability distribution
in the form of a graphoid, that is, in the form of a list of statements
“$X$ is independent of $Y$ given $Z$” obeying a
set of five properties (axioms). An input list of independency statements for
every CG is defined and it is shown that the classic moralization criterion for
CGs embraces exactly the graphoid closure of the input list. A new direct
separation criterion for reading independency statements from a CG is
introduced and shown to be equivalent to the moralization criterion. Using this
new criterion, it is proved that for every CG, there exists a strictly positive
discrete probability distribution that embodies exactly the independency
statements displayed by the graph. Thus, both criteria are shown to be complete
and the use of CGs as tools for description of conditional independence
structures is justified.
@article{1024691250,
author = {Studen\'y, Milan and Bouckaert, Remco R.},
title = {On chain graph models for description of conditional independence
structures},
journal = {Ann. Statist.},
volume = {26},
number = {3},
year = {1998},
pages = { 1434-1495},
language = {en},
url = {http://dml.mathdoc.fr/item/1024691250}
}
Studený, Milan; Bouckaert, Remco R. On chain graph models for description of conditional independence
structures. Ann. Statist., Tome 26 (1998) no. 3, pp. 1434-1495. http://gdmltest.u-ga.fr/item/1024691250/