An Algebraic Notion of Conditional Independence, and Its Application to Knowledge Representation
DOI:
https://doi.org/10.1609/aaai.v39i14.33641Abstract
Conditional independence is a crucial concept supporting adequate modelling and efficient reasoning in probabilistics. In knowledge representation, the idea of conditional independence has also been introduced for specific formalisms, such as propositional logic and belief revision. In this paper, the notion of conditional independence is studied in the algebraic framework of approximation fixpoint theory. This gives a language-independent account of conditional independence that can be straightforwardly applied to any logic with fixpoint semantics. It is shown how this notion allows to reduce global reasoning to parallel instances of local reasoning, leading to fixed-parameter tractability results. Furthermore, relations to existing notions of conditional independence are discussed and the framework is applied to normal logic programming.
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Published
2025-04-11
How to Cite
Heyninck, J. (2025). An Algebraic Notion of Conditional Independence, and Its Application to Knowledge Representation. Proceedings of the AAAI Conference on Artificial Intelligence, 39(14), 14967–14975. https://doi.org/10.1609/aaai.v39i14.33641
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Section
AAAI Technical Track on Knowledge Representation and Reasoning
