The theta-complete graph Ramsey number R(θn K5) = 4n - 3 for n = 6 and n≥ 10
| Author | Jaradat, M. M.M. |
| Author | Bataineh, M. S.A. |
| Author | Al Hazeem, N. |
| Available date | 2021-01-27T11:06:55Z |
| Publication Date | 2017 |
| Publication Name | Ars Combinatoria |
| Resource | Scopus |
| ISSN | 3817032 |
| Abstract | For any two graphs F1 and F2, the graph Ramsey number r(F1, F2) is the smallest positive integer N with the property that every graph of at least N vertices contains F1 or its complement contains F2 as a subgraph. In this paper, we consider the Ramsey numbers for theta-complete graphs. In fact, we prove that r(θn, K5) = 4n-3 for n = 6 and n ≥. |
| Language | en |
| Publisher | Charles Babbage Research Centre |
| Subject | Complete graph Independent set Ramsey number Theta graph |
| Type | Article |
| Pagination | 177-191 |
| Volume Number | 134 |
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