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AAAI
2008

Revising Imprecise Probabilistic Beliefs in the Framework of Probabilistic Logic Programming

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Revising Imprecise Probabilistic Beliefs in the Framework of Probabilistic Logic Programming
Probabilistic logic programming is a powerful technique to represent and reason with imprecise probabilistic knowledge. A probabilistic logic program (PLP) is a knowledge base which contains a set of conditional events with probability intervals. In this paper, we investigate the issue of revising such a PLP in light of receiving new information. We propose postulates for revising PLPs when a new piece of evidence is also a probabilistic conditional event. Our postulates lead to Jeffrey's rule and Bayesian conditioning when the original PLP defines a single probability distribution. Furthermore, we prove that our postulates are extensions to Darwiche and Pearl (DP) postulates when new evidence is a propositional formula. We also give the representation theorem for the postulates and provide an instantiation of revision operators satisfying the proposed postulates.
Anbu Yue, Weiru Liu
Added 02 Oct 2010
Updated 02 Oct 2010
Type Conference
Year 2008
Where AAAI
Authors Anbu Yue, Weiru Liu
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