The cycle-complete graph Ramsey number r(C6,K8)≤38

M.M.M. Jaradat; B.M.N. Alzaleq

doi:10.55937/sut/1234383514

June 2008 The cycle-complete graph Ramsey number

r{\rm{(}}{C_6}{\rm{,}}{K_8}{\rm{)}} \le {\rm{38}}

M.M.M. Jaradat, B.M.N. Alzaleq

Author Affiliations +

SUT J. Math. 44(2): 257-263 (June 2008). DOI: 10.55937/sut/1234383514

Abstract

The cycle-complete graph Ramsey number $r{\rm{(}}{C_m}{\rm{,\;}}{K_n}{\rm{)}}$ is the smallest integer $N$ such that every graph $G$ of order $N$ contains a cycle ${C_m}$ on m vertices or has independent number $\alpha (G) \ge n$ . It has been conjectured by Erdős, Faudree, Rousseau and Schelp that $r{\rm{(}}{C_m}{\rm{,}}{K_n}{\rm{) = (}}m - 1)(n - 1) + 1$ for all $m \ge n \ge 3$ (except $r({C_3},{K_3}) = 6$ ). In this paper, we show that $r({C_6},{K_8}) \le 38$ .

Acknowledgments

The authors wish to thank the referee whose valuable suggestions have significantly helped to improve the proofs of this article.

Citation

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M.M.M. Jaradat. B.M.N. Alzaleq. "The cycle-complete graph Ramsey number $r{\rm{(}}{C_6}{\rm{,}}{K_8}{\rm{)}} \le {\rm{38}}$ ." SUT J. Math. 44 (2) 257 - 263, June 2008. https://doi.org/10.55937/sut/1234383514