论文信息 - Causal models have no complete axiomatic characterization

Causal models have no complete axiomatic characterization

Markov networks and Bayesian networks are effective graphic representations of the dependencies embedded in probabilistic models. It is well known that independencies captured by Markov networks (called graph-isomorphs) have a finite axiomatic characterization. This paper, however, shows that independencies captured by Bayesian networks (called causal models) have no axiomatization by using even countably many Horn or disjunctive clauses. This is because a sub-independency model of a causal model may be not causal, while graph-isomorphs are closed under sub-models.

Sanjiang Li | Sanjiang Li

[1] Judea Pearl,et al. Probabilistic reasoning in intelligent systems - networks of plausible inference , 1991, Morgan Kaufmann series in representation and reasoning.

[2] Milan Studený,et al. Probabilistic conditional independence structures , 2006, Information science and statistics.

[3] Judea Pearl,et al. GRAPHOIDS: Graph-Based Logic for Reasoning about Relevance Relations OrWhen Would x Tell You More about y If You Already Know z? , 1986, ECAI.

[4] J. Pearl,et al. Logical and Algorithmic Properties of Conditional Independence and Graphical Models , 1993 .

[5] Dan Geiger,et al. On the logic of causal models , 2013, UAI.

[6] J. Pearl. Causality: Models, Reasoning and Inference , 2000 .

[7] Milan Studený,et al. Semigraphoids and structures of probabilistic conditional independence , 1997, Annals of Mathematics and Artificial Intelligence.

[8] Judea Pearl,et al. GRAPHOIDS: A Graph-based logic for reasoning about relevance relations , 1985 .

[9] Milan Studeny,et al. Conditional independence relations have no finite complete characterization , 1992 .