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CORR
2007
Springer

An Improved Tight Closure Algorithm for Integer Octagonal Constraints

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An Improved Tight Closure Algorithm for Integer Octagonal Constraints
Integer octagonal constraints (a.k.a. Unit Two Variables Per Inequality or UTVPI integer constraints) constitute an interesting class of constraints for the representation and solution of integer problems in the fields of constraint programming and formal analysis and verification of software and hardware systems, since they couple algorithms having polynomial complexity with a relatively good expressive power. The main algorithms required for the manipulation of such constraints are the satisfiability check and the computation of the inferential closure of a set of constraints. The latter is called tight closure to mark the difference with the (incomplete) closure algorithm that does not exploit the integrality of the variables. In this paper we present and fully justify an O(n3 ) algorithm to compute the tight closure of a set of UTVPI integer constraints.
Roberto Bagnara, Patricia M. Hill, Enea Zaffanella
Added 13 Dec 2010
Updated 13 Dec 2010
Type Journal
Year 2007
Where CORR
Authors Roberto Bagnara, Patricia M. Hill, Enea Zaffanella
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