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Universal algebra
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=== Constraint satisfaction problem === {{Main|Constraint satisfaction problem}} Universal algebra provides a natural language for the [[constraint satisfaction problem|constraint satisfaction problem (CSP)]]. CSP refers to an important class of computational problems where, given a relational algebra ''A'' and an existential [[sentence (mathematical logic)|sentence]] <math>\varphi</math> over this algebra, the question is to find out whether <math>\varphi</math> can be satisfied in ''A''. The algebra ''A'' is often fixed, so that CSP<sub>''A''</sub> refers to the problem whose instance is only the existential sentence <math>\varphi</math>. It is proved that every computational problem can be formulated as CSP<sub>''A''</sub> for some algebra ''A''.<ref>{{Citation|last1=Bodirsky|first1=Manuel|last2=Grohe|first2=Martin|date=2008|title=Non-dichotomies in constraint satisfaction complexity|url=http://www.lix.polytechnique.fr/~bodirsky/publications/nodich.pdf}}</ref> For example, the [[graph coloring|''n''-coloring]] problem can be stated as CSP of the algebra {{nowrap|({{mset|0, 1, ..., ''n''β1}}, β )}}, i.e. an algebra with ''n'' elements and a single relation, inequality.
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