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The Bipartite Ramsey Numbers b(C2m; C2n)

Year: 2013 Volume: 7 Issue: 1 135 - 138 Pages

• Authors:
• Rui Zhang
• Yongqi Sun
• and Yali Wu

Abstract: Given bipartite graphs H1 and H2, the bipartite Ramsey number b(H1;H2) is the smallest integer b such that any subgraph G of the complete bipartite graph Kb,b, either G contains a copy of H1 or its complement relative to Kb,b contains a copy of H2. It is known that b(K2,2;K2,2) = 5, b(K2,3;K2,3) = 9, b(K2,4;K2,4) = 14 and b(K3,3;K3,3) = 17. In this paper we study the case that both H1 and H2 are even cycles, prove that b(C2m;C2n) ≥ m + n - 1 for m = n, and b(C2m;C6) = m + 2 for m ≥ 4.

• Keywords:
• bipartite graph
• Ramsey number
• even cycle

Lower Bounds of Some Small Ramsey Numbers

Year: 2012 Volume: 6 Issue: 9 1289 - 1291 Pages

• Authors:
• Decha Samana
• Vites Longani

Abstract: For positive integer s and t, the Ramsey number R(s, t) is the least positive integer n such that for every graph G of order n, either G contains Ks as a subgraph or G contains Kt as a subgraph. We construct the circulant graphs and use them to obtain lower bounds of some small Ramsey numbers.

• Keywords:
• Lower bound
• Ramsey numbers
• Graphs
• Distance line.