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Existential Rule Languages with Finite Chase: Complexity and Expressiveness

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arxiv 1411.5220 v3 pith:OEXIVFXQ submitted 2014-11-19 cs.AI cs.DBcs.LO

Existential Rule Languages with Finite Chase: Complexity and Expressiveness

classification cs.AI cs.DBcs.LO
keywords languageschaserulecomplexityfinitecombinedacyclicapproach
verification ladder T0 review T1 audit T2 compute T3 formal T4 reserved
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Finite chase, or alternatively chase termination, is an important condition to ensure the decidability of existential rule languages. In the past few years, a number of rule languages with finite chase have been studied. In this work, we propose a novel approach for classifying the rule languages with finite chase. Using this approach, a family of decidable rule languages, which extend the existing languages with the finite chase property, are naturally defined. We then study the complexity of these languages. Although all of them are tractable for data complexity, we show that their combined complexity can be arbitrarily high. Furthermore, we prove that all the rule languages with finite chase that extend the weakly acyclic language are of the same expressiveness as the weakly acyclic one, while rule languages with higher combined complexity are in general more succinct than those with lower combined complexity.

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