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CP
2007
Springer

Groupoids and Conditional Symmetry

14 years 5 months ago
Groupoids and Conditional Symmetry
We introduce groupoids – generalisations of groups in which not all pairs of elements may be multiplied, or, equivalently, categories in which all morphisms are invertible – as the appropriate algebraic structures for dealing with conditional symmetries in Constraint Satisfaction Problems (CSPs). We formally define the Full Conditional Symmetry Groupoid associated with any CSP, giving bounds for the number of elements that this groupoid can contain. We describe conditions under which a Conditional Symmetry sub-Groupoid forms a group, and, for this case, present an algorithm for breaking all conditional symmetries that arise at a search node. Our algorithm is polynomial-time when there is a corresponding algorithm for the type of group involved. We prove that our algorithm is both sound and complete – neither gaining nor losing solutions. We report on an implementation of the algorithm.
Ian P. Gent, Tom Kelsey, S. A. Linton, J. Pearson,
Added 07 Jun 2010
Updated 07 Jun 2010
Type Conference
Year 2007
Where CP
Authors Ian P. Gent, Tom Kelsey, S. A. Linton, J. Pearson, Colva M. Roney-Dougal
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