On the k-Boundedness for Existential Rules

October 22, 2018 Β· Declared Dead Β· πŸ› RuleML+RR

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Authors Stathis Delivorias, Michel Leclere, Marie-Laure Mugnier, Federico Ulliana arXiv ID 1810.09304 Category cs.AI: Artificial Intelligence Cross-listed cs.DB Citations 8 Venue RuleML+RR Last Checked 4 months ago
Abstract
The chase is a fundamental tool for existential rules. Several chase variants are known, which differ on how they handle redundancies possibly caused by the introduction of nulls. Given a chase variant, the halting problem takes as input a set of existential rules and asks if this set of rules ensures the termination of the chase for any factbase. It is well-known that this problem is undecidable for all known chase variants. The related problem of boundedness asks if a given set of existential rules is bounded, i.e., whether there is a predefined upper bound on the number of (breadth-first) steps of the chase, independently from any factbase. This problem is already undecidable in the specific case of datalog rules. However, knowing that a set of rules is bounded for some chase variant does not help much in practice if the bound is unknown. Hence, in this paper, we investigate the decidability of the k-boundedness problem, which asks whether a given set of rules is bounded by an integer k. We prove that k-boundedness is decidable for three chase variants, namely the oblivious, semi-oblivious and restricted chase.
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