Existential rule languages with finite chase : complexity and expressiveness

Heng Zheng; Yan Zhang; Jia-Huai You

Existential rule languages with finite chase : complexity and expressiveness

Heng Zheng, Yan Zhang, Jia-Huai You

Research output: Chapter in Book / Conference Paper › Conference Paper › peer-review

11 Citations (Scopus)

Abstract

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.

Original language	English
Title of host publication	Proceedings of the Twenty-Ninth AAAI Conference on Artificial Intelligence, January 25Ã¢€“30, 2015, Austin, Texas, USA
Publisher	AAAI Press
Pages	1678-1684
Number of pages	10
ISBN (Print)	9781577356981
Publication status	Published - 2015
Event	AAAI Conference on Artificial Intelligence - , United States Duration: 1 Jan 1980 → …

Publication series

Name
ISSN (Print)	2159-5399

Conference

Conference	AAAI Conference on Artificial Intelligence
Country/Territory	United States
Period	1/01/80 → …

Keywords

computational complexity
finite chase
rule languages

Cite this

@inproceedings{35c4c042f0db4a53bb96c1f5337cdf18,

title = "Existential rule languages with finite chase : complexity and expressiveness",

abstract = "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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author = "Heng Zheng and Yan Zhang and Jia-Huai You",

year = "2015",

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pages = "1678--1684",

booktitle = "Proceedings of the Twenty-Ninth AAAI Conference on Artificial Intelligence, January 25{\~A}¢€“30, 2015, Austin, Texas, USA",

note = "AAAI Conference on Artificial Intelligence ; Conference date: 01-01-1980",

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TY - GEN

T1 - Existential rule languages with finite chase : complexity and expressiveness

AU - Zheng, Heng

AU - Zhang, Yan

AU - You, Jia-Huai

PY - 2015

Y1 - 2015

N2 - 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.

AB - 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.

KW - computational complexity

KW - finite chase

KW - rule languages

UR - http://handle.uws.edu.au:8081/1959.7/uws:29999

UR - http://www.aaai.org/Conferences/AAAI/aaai15.php

M3 - Conference Paper

SN - 9781577356981

SP - 1678

EP - 1684

BT - Proceedings of the Twenty-Ninth AAAI Conference on Artificial Intelligence, January 25Ã¢€“30, 2015, Austin, Texas, USA

PB - AAAI Press

T2 - AAAI Conference on Artificial Intelligence

Y2 - 1 January 1980

ER -

Existential rule languages with finite chase : complexity and expressiveness

Abstract

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Keywords

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