论文信息 - On Marginalization, Collapsibility and Precollapsibility

On Marginalization, Collapsibility and Precollapsibility

It is shown that for every undirected graph G over a finite set N and for every nonempty T ⊂ N there exists an undirected graph G T over T, called the marginal graph of G for T, such that the class of marginal distributions for T of (discrete) G-Markovian distributions coincides with the class of G T-Markovian distributions. An example shows that this is not true within the framework of strictly positive probability distributions. However, an analogous positive result holds for hypergraphs and classes of strictly positive factorizable distributions.

Milan Studený | M. Studený

[1] M. Frydenberg. Marginalization and Collapsibility in Graphical Interaction Models , 1990 .

[2] M. Studený. DESCRIPTION OF STRUCTURES OF STOCHASTIC CONDITIONAL INDEPENDENCE BY MEANS OF FACES AND IMSETS 1st part: introduction and basic concepts 1 , 1995 .

[3] Steffen L. Lauritzen,et al. Independence properties of directed markov fields , 1990, Networks.

[4] Francesco M. Malvestuto. Testing implication of hierarchical log-linear models for probability distributions , 1996, Stat. Comput..

[5] D. Edwards,et al. Collapsibility and response variables in contingency tables , 1983 .