Improved Lower Bounds for Multicolour Ramsey Numbers using SAT-Solvers
Abstract
This paper sets out the results of a range of searches for linear and cyclic graph colourings with specific Ramsey properties. The new graphs comprise mainly 'template graphs' which can be used in a construction described by the current author in 2021 to build linear or cyclic compound graphs with inherited Ramsey properties. These graphs result in improved lower bounds for a wide range of multicolour Ramsey numbers. Searches were carried out using relatively simple programs (written in the language `C') to generate clauses for input to the PeneLoPe and Plingeling parallel SAT-solvers. When solutions were found, the output from the solvers specified the desired graph colourings. The majority of the graphs produced by this work are `template graphs' with parameters in the form or with . Using these template graphs in familiar constructions, it has been possible to demonstrate significant improvements for lower bounds for most for and . These improvements provide correspondingly increased lower bounds on . We also show that and . Other new lower bounds include and , based on non-template cyclic graphs, and the interesting particular cases and . A spreadsheet containing specimens of many of the graphs mentioned here will be attached as an ArXiv ancillary file.
Keywords
Cite
@article{arxiv.2203.13476,
title = {Improved Lower Bounds for Multicolour Ramsey Numbers using SAT-Solvers},
author = {Fred Rowley},
journal= {arXiv preprint arXiv:2203.13476},
year = {2022}
}
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9 pages