On the Ramsey number for paths and beaded wheels

Authors

  • Kashif Ali Faculty of Mathematics, COMSATS Institute of Information Technology, Lahore, Pakistan.
  • Edy Tri Baskoro Combinatorial Mathematics Research Division, Faculty of Mathematics and Natural Sciences, Institut Teknologi Bandung Jalan Genesha, Bandung, Indonesia.
  • Ioan Tomescu Faculty of Mathematics and Computer Sciences, University of Bucharest, Bucharest, Romania.

Keywords:

Ramsey number, path, beaded wheel

Abstract

For given graphs GG and HH, the Ramsey number R(G,H)R(G,H) is the least natural number n such that for every graph FF of order nn the following condition holds: either FF contains GG or the complement of FF contains HH. Beaded wheel BW2,mBW2,m is a graph of order 2m+12m+1 which is obtained by inserting a new vertex in each spoke of the wheel WmWm. In this paper, we determine the Ramsey number of paths versus Beaded wheels: R(Pn,BW2,m)=2n−1R(Pn,BW2,m)=2n−1 or 2n2n if m≥3m≥3 is even or odd, respectively, provided n≥2m2−5m+4n≥2m2−5m+4.

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Published

2009-12-31

Issue

Vol. 5 No. 1 (2009): Journal of Prime Research in Mathematics

Section

Regular

How to Cite

On the Ramsey number for paths and beaded wheels. (2009). Journal of Prime Research in Mathematics, 5(1), 133 – 138. https://jprm.sms.edu.pk/index.php/jprm/article/view/52