A note on on-line Ramsey numbers of stars and paths
An on-line Ramsey game is a game between two players, Builder and Painter, on an initially empty graph with unbounded set of vertices. In each round, Builder selects two vertices and joins them with an edge while Painter colours the edge immediately with either red or blue. Builder's aim is to...
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2021
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my.um.eprints.275582022-06-09T04:31:04Z http://eprints.um.edu.my/27558/ A note on on-line Ramsey numbers of stars and paths Mohd Latip, Fatin Nur Nadia Binti Tan, Ta Sheng QA Mathematics An on-line Ramsey game is a game between two players, Builder and Painter, on an initially empty graph with unbounded set of vertices. In each round, Builder selects two vertices and joins them with an edge while Painter colours the edge immediately with either red or blue. Builder's aim is to force either a red copy of a fixed graph G or a blue copy of a fixed graph H. The game ends with Builder's victory when Builder manages to force either a red G or a blue H. The minimum number of rounds for Builder to win the game, regardless of Painter's strategy, is the on-line Ramsey number r (G, H). This note focuses on the case when G and H are stars and paths. In particular, we will prove the upper bound of r (S-3, Pl+1) <= 5l/3 + 2. We will also present an alternative proof for the upper bound of r (S-2 = P-3, Pl+1) = 5l/4]. Malaysian Mathematical Sciences Soc 2021-09 Article PeerReviewed Mohd Latip, Fatin Nur Nadia Binti and Tan, Ta Sheng (2021) A note on on-line Ramsey numbers of stars and paths. Bulletin of the Malaysian Mathematical Sciences Society, 44 (5). pp. 3511-3521. ISSN 0126-6705, DOI https://doi.org/10.1007/s40840-021-01130-x <https://doi.org/10.1007/s40840-021-01130-x>. 10.1007/s40840-021-01130-x |
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QA Mathematics Mohd Latip, Fatin Nur Nadia Binti Tan, Ta Sheng A note on on-line Ramsey numbers of stars and paths |
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An on-line Ramsey game is a game between two players, Builder and Painter, on an initially empty graph with unbounded set of vertices. In each round, Builder selects two vertices and joins them with an edge while Painter colours the edge immediately with either red or blue. Builder's aim is to force either a red copy of a fixed graph G or a blue copy of a fixed graph H. The game ends with Builder's victory when Builder manages to force either a red G or a blue H. The minimum number of rounds for Builder to win the game, regardless of Painter's strategy, is the on-line Ramsey number r (G, H). This note focuses on the case when G and H are stars and paths. In particular, we will prove the upper bound of r (S-3, Pl+1) <= 5l/3 + 2. We will also present an alternative proof for the upper bound of r (S-2 = P-3, Pl+1) = 5l/4]. |
| format |
Article |
| author |
Mohd Latip, Fatin Nur Nadia Binti Tan, Ta Sheng |
| author_facet |
Mohd Latip, Fatin Nur Nadia Binti Tan, Ta Sheng |
| author_sort |
Mohd Latip, Fatin Nur Nadia Binti |
| title |
A note on on-line Ramsey numbers of stars and paths |
| title_short |
A note on on-line Ramsey numbers of stars and paths |
| title_full |
A note on on-line Ramsey numbers of stars and paths |
| title_fullStr |
A note on on-line Ramsey numbers of stars and paths |
| title_full_unstemmed |
A note on on-line Ramsey numbers of stars and paths |
| title_sort |
note on on-line ramsey numbers of stars and paths |
| publisher |
Malaysian Mathematical Sciences Soc |
| publishDate |
2021 |
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http://eprints.um.edu.my/27558/ |
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1735570291603537920 |