Some three-color Ramsey numbers, \(R(P_4,P_5,C_k)\) and \(R(P_4,P_6,C_k)\) (Q1003590)
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scientific article; zbMATH DE number 5523090
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Some three-color Ramsey numbers, \(R(P_4,P_5,C_k)\) and \(R(P_4,P_6,C_k)\) |
scientific article; zbMATH DE number 5523090 |
Statements
Some three-color Ramsey numbers, \(R(P_4,P_5,C_k)\) and \(R(P_4,P_6,C_k)\) (English)
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4 March 2009
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Some three color Ramsey numbers are proved, which add to the relatively small number of such results. It is shown that \(R(P_4, P_5, C_k) = k + 2\) for \(k \leq 23\), and \(R(P_4, P_6, C_k) = k + 3\) for \(k \geq 18\). In addition the following small order cases were verified: \(R(P_4, P_5, C_3) = 11\), \(R(P_4, P_5, C_4) = 7\), \(R(P_4, P_5, C_5) = 11\), \(R(P_4, P_5, C_7) = 11\), \(R(P_4, P_6, C_s) = 13\) for \(s = 3, 5\) and \(7\).
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Ramsey numbers
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three colors
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paths
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cycles
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0.94170743
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0.9376204
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0.9230342
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0.9038684
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0.89903057
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0.89764655
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