19/08/2021

Computing Optimal Hypertree Decompositions with SAT

Andre Schidler, Stefan Szeider

Keywords: Constraints and SAT, Constraint Satisfaction, Constraints, Satisfiability Modulo Theories

Abstract Paper Similar Papers

Abstract: Hypertree width is a prominent hypergraph invariant with many algorithmic applications in constraint satisfaction and databases. We propose a novel characterization for hypertree width in terms of linear elimination orderings. We utilize this characterization to generate a new SAT encoding that we evaluate on an extensive set of benchmark instances. We compare it to state-of-the-art exact methods for computing optimal hypertree width. Our results show that the encoding based on the new characterization is not only significantly more compact than known encodings but also outperforms the other methods.

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