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AAAI
2008
2008
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.
Real-time TrafficAAAI 2008 | Conditional Event | Imprecise Probabilistic Knowledge | Intelligent Agents | Probabilistic Logic |
Related Content
| Added | 02 Oct 2010 |
| Updated | 02 Oct 2010 |
| Type | Conference |
| Year | 2008 |
| Where | AAAI |
| Authors | Anbu Yue, Weiru Liu |
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