Yongqi Sun, Yali Wu, Rui Zhang, Yuansheng Yang
Department of Computer Science, Dalian University of Technology, Dalian, China.
School of Computer and Information Technology, Beijing jiaotong University, Beijing, China.
DOI: 10.4236/ajcm.2013.33B009   PDF    HTML     2,686 Downloads   4,363 Views   Citations

Abstract

The planar Ramsey number PR (H₁, H₂) is the smallest integer n such that any planar graph on n vertices contains a copy of H₁ or its complement contains a copy of H₂. It is known that the Ramsey number R(K₄ -e, K₆) = 21, and the planar Ramsey numbers PR(K₄ - e, K_l) for l ≤ 5 are known. In this paper, we give the lower bounds on PR (K₄ ? e, K_l) and determine the exact value of PR (K₄ - e, K₆).

Keywords

Planar Graph; Ramsey Number; Forbidden Subgraph

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Conflicts of Interest

The authors declare no conflicts of interest.

References

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