Alternative Markov Properties for Chain Graphs

Autor:	Steen A. Andersson, Michael D. Perlman, David Madigan
Rok vydání:	2001
Předmět:	Statistics and Probability Combinatorics Continuous-time Markov chain Markov kernel Markov chain Variable-order Markov model Additive Markov chain Markov property Graph theory Statistics Probability and Uncertainty Markov model Mathematics
Zdroj:	Scandinavian Journal of Statistics. 28:33-85
ISSN:	1467-9469 0303-6898
DOI:	10.1111/1467-9469.00224
Popis:	Graphical Markov models use graphs to represent possible dependences among statistical variables. Lauritzen, Wermuth, and Frydenberg (LWF) introduced a Markov property for chain graphs (CG): graphs that can be used to represent both structural and associative dependences simultaneously and that include both undirected graphs (UG) and acyclic directed graphs (ADG) as special cases. Here an alternative Markov property (AMP) for CGs is introduced and shown to be the Markov property satisfied by a block-recursive linear system with multivariate normal errors. This model can be decomposed into a collection of conditional normal models, each of which combines the features of multivariate linear regression models and covariance selection models, facilitating the estimation of its parameters. In the general case, necessary and sufficient conditions are given for the equivalence of the LWF and AMP Markov properties of a CG, for the AMP Markov equivalence of two CGs, for the AMP Markov equivalence of a CG to some ADG or decomposable UG, and for other equivalences. For CGs, in some ways the AMP property is a more direct extension of the ADG Markov property than is the LWF property.
Databáze:	OpenAIRE
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