The packing chromatic number of the infinite square lattice is between 13 and 15

The packing chromatic number of the infinite square lattice is between 13 and 15

Using a SAT-solver on top of a partial previously-known solution we improve the upper bound of the packing chromatic number of the infinite square lattice from 17 to 15. We discuss the merits of SAT-solving for this kind of problem as well as compare the performance of different encodings. Further,...

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Hauptverfasser: Martin, Barnaby, Raimondi, Franco, Chen, Taolue, Martin, Jos
Format: Artikel
Sprache:eng
Schlagworte:
Computer Science - Discrete Mathematics
Mathematics - Combinatorics
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Zusammenfassung:Using a SAT-solver on top of a partial previously-known solution we improve the upper bound of the packing chromatic number of the infinite square lattice from 17 to 15. We discuss the merits of SAT-solving for this kind of problem as well as compare the performance of different encodings. Further, we improve the lower bound from 12 to 13 again using a SAT-solver, demonstrating the versatility of this technology for our approach.
DOI:10.48550/arxiv.1510.02374