Nested Markov Properties for Acyclic Directed Mixed Graphs
Abstract
Conditional independence models associated with directed acyclic graphs (DAGs) may be characterized in at least three different ways: via a factorization, the global Markov property (given by the d-separation criterion), and the local Markov property. Marginals of DAG models also imply equality constraints that are not conditional independences; the well-known ``Verma constraint'' is an example. Constraints of this type are used for testing edges, and in a computationally efficient marginalization scheme via variable elimination. We show that equality constraints like the ``Verma constraint'' can be viewed as conditional independences in kernel objects obtained from joint distributions via a fixing operation that generalizes conditioning and marginalization. We use these constraints to define, via ordered local and global Markov properties, and a factorization, a graphical model associated with acyclic directed mixed graphs (ADMGs). We prove that marginal distributions of DAG models lie in this model, and that a set of these constraints given by Tian provides an alternative definition of the model. Finally, we show that the fixing operation used to define the model leads to a particularly simple characterization of identifiable causal effects in hidden variable causal DAG models.
Keywords
Cite
@article{arxiv.1701.06686,
title = {Nested Markov Properties for Acyclic Directed Mixed Graphs},
author = {Thomas S. Richardson and Robin J. Evans and James M. Robins and Ilya Shpitser},
journal= {arXiv preprint arXiv:1701.06686},
year = {2023}
}
Comments
36 pages (not including appendix and references), 9 figures. Fixed a definition following equation (16) in the main text (the fix is shown in blue text). Fixed double parentheses showing up for some references