Computing the Ramsey Number R(K5-P3,K5)
Abstract
We give a computer-assisted proof of the fact that R(K5-P3, K5)=25. This solves one of the three remaining open cases in Hendry's table, which listed the Ramsey numbers for pairs of graphs on 5 vertices. We find that there exist no (K5-P3,K5)-good graphs containing a K4 on 23 or 24 vertices, where a graph F is (G,H)-good if F does not contain G and the complement of F does not contain H. The unique (K5-P3,K5)-good graph containing a K4 on 22 vertices is presented.
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