Uniform Labelled Calculi for Conditional and Counterfactual Logics
| Authors |
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| Publication date | 2019 |
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| Book title | Logic, Language, Information, and Computation |
| Book subtitle | 26th International Workshop, WoLLIC 2019, Utrecht, The Netherlands, July 2-5, 2019 : proceedings |
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| ISBN (electronic) |
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| Series | Lecture Notes in Computer Science |
| Event | 26th International Workshop on Logic, Language, Information, and Computation |
| Pages (from-to) | 248-263 |
| Publisher | Berlin: Springer |
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| Abstract |
Lewis’s counterfactual logics are a class of conditional logics that are defined as extensions of classical propositional logic with a two-place modal operator expressing conditionality. Labelled proof systems are proposed here that capture in a modular way Burgess’s preferential conditional logic PCL, Lewis’s counterfactual logic V, and their extensions. The calculi are based on preferential models, a uniform semantics for conditional logics introduced by Lewis. The calculi are analytic, and their completeness is proved by means of countermodel construction. Due to termination in root-first proof search, the calculi also provide a decision procedure for the logics.
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| Document type | Conference contribution |
| Language | English |
| Published at | https://doi.org/10.1007/978-3-662-59533-6_16 |
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