In the plethora of fragments of Halpern and Shoham's modal logic of time intervals (HS), the logic AB of Allen's relations Meets and Started-by is at a central position. Statements that may be true at certain intervals, but at no sub-interval of them, such as accomplishments, as well as metric constraints about the length of intervals, that force, for instance, an interval to be at least (resp., at most, exactly) k points long, can be expressed in AB. Moreover, over the linear order of the natural numbers double-struck N, it subsumes the (point-based) logic LTL, as it can easily encode the next and until modalities. Finally, it is expressive enough to capture the ω-regular languages, that is, for each ω-regular expression R there exists an AB formula φ such that the language defined by R coincides with the set of models of φ over double-struck N. It has been shown that the satisfiability problem for AB over double-struck N is EXPSPACE-complete. Here we prove that, under the homogeneity assumption, its model checking problem is Δ2 p = PNP-complete (for the sake of comparison, the model checking problem for full HS is EXPSPACE-hard, and the only known decision procedure is nonelementary). Moreover, we show that the modality for the Allen relation Met-by can be added to AB at no extra cost (AĀB is PNP-complete as well). © Bozzelli, Molinari, Montanari, Peron & Sala.
Model Checking the Logic of Allen's Relations Meets and Started-by is P^NP-Complete / Bozzelli, Laura; Molinari, Alberto; Montanari, Angelo; Peron, Adriano; Sala, Pietro. - In: ELECTRONIC PROCEEDINGS IN THEORETICAL COMPUTER SCIENCE. - ISSN 2075-2180. - 226:(2016), pp. 76-90. (Intervento presentato al convegno Seventh International Symposium on Games, Automata, Logics and Formal Verification, GandALF 2016 tenutosi a Catania nel 14-16 September 2016.) [10.4204/EPTCS.226.6].
Model Checking the Logic of Allen's Relations Meets and Started-by is P^NP-Complete
Bozzelli, Laura;PERON, ADRIANO;
2016
Abstract
In the plethora of fragments of Halpern and Shoham's modal logic of time intervals (HS), the logic AB of Allen's relations Meets and Started-by is at a central position. Statements that may be true at certain intervals, but at no sub-interval of them, such as accomplishments, as well as metric constraints about the length of intervals, that force, for instance, an interval to be at least (resp., at most, exactly) k points long, can be expressed in AB. Moreover, over the linear order of the natural numbers double-struck N, it subsumes the (point-based) logic LTL, as it can easily encode the next and until modalities. Finally, it is expressive enough to capture the ω-regular languages, that is, for each ω-regular expression R there exists an AB formula φ such that the language defined by R coincides with the set of models of φ over double-struck N. It has been shown that the satisfiability problem for AB over double-struck N is EXPSPACE-complete. Here we prove that, under the homogeneity assumption, its model checking problem is Δ2 p = PNP-complete (for the sake of comparison, the model checking problem for full HS is EXPSPACE-hard, and the only known decision procedure is nonelementary). Moreover, we show that the modality for the Allen relation Met-by can be added to AB at no extra cost (AĀB is PNP-complete as well). © Bozzelli, Molinari, Montanari, Peron & Sala.File | Dimensione | Formato | |
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