R(K6-e, K4) = 30
Abstract
We settle the Ramsey problem R(K6 - e, K4), also known as R(J6, K4) and R(K6-, K4). Previously, the best bounds were 30 ≤ R(K6 - e, K4) ≤ 32. We prove that R(K6 - e, K4) = 30. Our technique is based on the recent approach of Angeltveit and McKay and on older algorithms of McKay and Radziszowski.
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