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In mathematical logic and theoretical computer science, an abstract rewriting system (also (abstract) reduction system or abstract rewrite system; abbreviated ARS) is a formalism that captures the quintessential notion and properties of rewriting systems. In its simplest form, an ARS is simply a set (of "objects") together with a binary relation, traditionally denoted with ; this definition can be further refined if we index (label) subsets of the binary relation. Despite its simplicity, an ARS is sufficient to describe important properties of rewriting systems like normal forms, termination, and various notions of confluence.

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rdfs:label	Abstract rewriting system (en)
rdfs:comment	In mathematical logic and theoretical computer science, an abstract rewriting system (also (abstract) reduction system or abstract rewrite system; abbreviated ARS) is a formalism that captures the quintessential notion and properties of rewriting systems. In its simplest form, an ARS is simply a set (of "objects") together with a binary relation, traditionally denoted with ; this definition can be further refined if we index (label) subsets of the binary relation. Despite its simplicity, an ARS is sufficient to describe important properties of rewriting systems like normal forms, termination, and various notions of confluence. (en)
sameAs	Abstract rewriting system Abstract rewriting system
dbp:wikiPageUsesTemplate	dbt:Cite_book dbt:ISBN dbt:Main dbt:Reflist
Subject	Rewriting systems Formal languages Logic in computer science
Link from a Wikipage to an external page	https://books.google.com/books%3Fid=N7BvXVUCQk8C%7Cisbn=9780521779203 http://citeseer.ist.psu.edu/viewdoc/summary%3Fdoi=10.1.1.64.3114 http://downloads.hindawi.com/journals/ijmms/2010/458563.pdf
thumbnail	wiki-commons:Special:FilePath/Cyclic_locally,_but_not_globally_confluent_rewrite_system.png?width=300
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prov:wasDerivedFrom	http://en.wikipedia.org/wiki/Abstract_rewriting_system?oldid=1068459962&ns=0
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Wikipage revision ID	1068459962 (xsd:integer)
Link from a Wikipage to another Wikipage	Formalism (philosophy of mathematics) Nachum Dershowitz Normal form (abstract rewriting) Ronald V. Book Well-founded relation Alonzo Church Associative property Binary relation Rewriting systems Jan Willem Klop Jan van Leeuwen Journal of the ACM Formal languages Logic in computer science Jean-Pierre Jouannaud Set (mathematics) Word problem (mathematics) Preorder Preprint Closure (mathematics) Commutative property Composition of relations Confluence (abstract rewriting) Converse relation Homogeneous relation John Harrison Newman's lemma Rewriting Equational logic Equivalence relation Symmetric closure Gérard Huet Lambda calculus Transition system Transitive closure Theoretical computer science J. Barkley Rosser Mathematical logic dbr:Marc_Bezem dbr:Roel_de_Vrijer
has abstract	In mathematical logic and theoretical computer science, an abstract rewriting system (also (abstract) reduction system or abstract rewrite system; abbreviated ARS) is a formalism that captures the quintessential notion and properties of rewriting systems. In its simplest form, an ARS is simply a set (of "objects") together with a binary relation, traditionally denoted with ; this definition can be further refined if we index (label) subsets of the binary relation. Despite its simplicity, an ARS is sufficient to describe important properties of rewriting systems like normal forms, termination, and various notions of confluence. Historically, there have been several formalizations of rewriting in an abstract setting, each with its idiosyncrasies. This is due in part to the fact that some notions are equivalent, see below in this article. The formalization that is most commonly encountered in monographs and textbooks, and which is generally followed here, is due to Gérard Huet (1980). (en)
foaf:isPrimaryTopicOf	http://en.wikipedia.org/wiki/Abstract_rewriting_system
is Wikipage redirect of	Abstract rewrite system Canonical rewrite system Canonical rewriting system Canonical term rewrite system Canonical term rewriting system Convergent rewrite system Convergent rewriting system Convergent term rewrite system Convergent term rewriting system Terminating relation Reduction relation Reduction (abstract rewriting) Abstract reduction system Abstract rewriting
is Link from a Wikipage to another Wikipage of	Noetherian Normal form (abstract rewriting) Abstract rewrite system Ars Binary relation Boolean algebra (structure) Canonical form Canonical rewrite system Canonical rewriting system Canonical term rewrite system Canonical term rewriting system Divergence (computer science) Church–Rosser theorem Linda (coordination language) Confluence (abstract rewriting) Convergent rewrite system Convergent rewriting system Convergent term rewrite system Convergent term rewriting system Newman's lemma Graph rewriting Dershowitz–Manna ordering Géraud Sénizergues

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