Author:
Dzido Tomasz,Zakrzewska Renata
Abstract
We consider the important generalisation of Ramsey numbers, namely on-line Ramsey numbers. It is easiest to understand them by considering a game between two players, a Builder and Painter, on an infinite set of vertices. In each round, the Builder joins two non-adjacent vertices with an edge, and the Painter colors the edge red or blue. An on-line Ramsey number r˜(G,H) is the minimum number of rounds it takes the Builder to force the Painter to create a red copy of graph G or a blue copy of graph H, assuming that both the Builder and Painter play perfectly. The Painter’s goal is to resist to do so for as long as possible. In this paper, we consider the case where G is a path P4 and H is a path P10 or P11.
Subject
General Mathematics,Engineering (miscellaneous),Computer Science (miscellaneous)
Reference6 articles.
1. On-line Ramsey Numbers of Paths and Cycles
2. On-line Ramsey numbers for paths and short cycles
3. Achievement games and the probabilistic method;Beck;Comb. Paul Erdos Eighty,1993
4. Two variants of the size Ramsey number
5. A note on off-diagonal small on-line Ramsey numbers for paths;Prałat;Ars Comb.,2012
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