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TABLEAUX
2007
Springer
2007
Springer
Tableau Systems for Logics of Subinterval Structures over Dense Orderings
We construct a sound, complete, and terminating tableau system for the interval temporal logic D · interpreted in interval structures over dense linear orderings endowed with strict subinterval relation (where both endpoints of the sub-interval are strictly inside the interval). In order to prove the soundness and completeness of our tableau construction, we introduce a kind of finite pseudo-models for our logic, called D · -structures, and show that every formula satisfiable in D · is satisfiable in such pseudo-models, thereby proving small-model property and decidability in PSPACE of D · , a result established earlier by Shapirovsky and Shehtman by means of filtration. We also show how to extend our results to the interval logic D interpreted over dense interval structures with proper (irreflexive) subinterval relation, which differs substantially from D · and is generally more difficult to analyze. Up to our knowledge, no complete deductive systems and decidability result...
Real-time TrafficArtificial Intelligence | Dense Linear Orderings | Interval Structures | Interval Temporal Logic | TABLEAUX 2007 |
| Added | 09 Jun 2010 |
| Updated | 09 Jun 2010 |
| Type | Conference |
| Year | 2007 |
| Where | TABLEAUX |
| Authors | Davide Bresolin, Valentin Goranko, Angelo Montanari, Pietro Sala |
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