Add to ORKGThe Ramsey game we consider in this paper is played on an unbounded set of vertices by two players, called Builder and Painter. In one move Builder introduces a new edge and Painter paints it red or blue. The goal of Builder is to force Painter to create a monochromatic copy of a fixed target graph H, keeping the constructed graph in a prescribed class G. The main problem is to recognize the winner for a given pair H, G. In particular, we prove that Builder has a winning strategy for any k-colorable graph H in the game played on k-colorable graphs. Another class of graphs with this strange self-unavoidability property is the class of forests. We show that the class of outerplanar graphs does not have this property. The question of whether p...
We study on-line version of size-Ramsey numbers of graphs defined via a game played between Builder ...
The classical result in the theory of random graphs, proved by Erd˝os and R´enyi in 1960, concerns t...
AbstractWe consider the following game played on a finite graph G. Let r and d be positive integers....
An online Ramsey game is a game between Builder and Painter, alternating in turns. In each round Bui...
Consider the following one-player game: The board is a graph with n vertices, which initially contai...
When graph Ramsey theory is viewed as a game, “Painter ” 2-colors the edges of a graph presented by ...
Given a class of graphs and a fixed graph H, the online Ramsey game for H on is a game between tw...
On-line Ramsey theory studies a graph-building game between two players. The player called Builder b...
Ramsey theory studies the internal homogenity of mathematical structures (graphs, number sets), part...
Ramsey theory studies the internal homogenity of mathematical structures (graphs, number sets), part...
AbstractIn Sim, two players compete on a complete graph of six vertices (K6). The players alternate ...
Consider the following game between two players, Builder and Painter. Builder draws edges one at a t...
AbstractThis paper discusses a coloring game on graphs. Let k,d be non-negative integers and C a set...
The (G1,G2)-online Ramsey game is a two-player turn-based game between a builder and a painter. Star...
Let F and K be graphs with no isolated points. The graph achievement game (F,K) is described as foll...
We study on-line version of size-Ramsey numbers of graphs defined via a game played between Builder ...
The classical result in the theory of random graphs, proved by Erd˝os and R´enyi in 1960, concerns t...
AbstractWe consider the following game played on a finite graph G. Let r and d be positive integers....
An online Ramsey game is a game between Builder and Painter, alternating in turns. In each round Bui...
Consider the following one-player game: The board is a graph with n vertices, which initially contai...
When graph Ramsey theory is viewed as a game, “Painter ” 2-colors the edges of a graph presented by ...
Given a class of graphs and a fixed graph H, the online Ramsey game for H on is a game between tw...
On-line Ramsey theory studies a graph-building game between two players. The player called Builder b...
Ramsey theory studies the internal homogenity of mathematical structures (graphs, number sets), part...
Ramsey theory studies the internal homogenity of mathematical structures (graphs, number sets), part...
AbstractIn Sim, two players compete on a complete graph of six vertices (K6). The players alternate ...
Consider the following game between two players, Builder and Painter. Builder draws edges one at a t...
AbstractThis paper discusses a coloring game on graphs. Let k,d be non-negative integers and C a set...
The (G1,G2)-online Ramsey game is a two-player turn-based game between a builder and a painter. Star...
Let F and K be graphs with no isolated points. The graph achievement game (F,K) is described as foll...
We study on-line version of size-Ramsey numbers of graphs defined via a game played between Builder ...
The classical result in the theory of random graphs, proved by Erd˝os and R´enyi in 1960, concerns t...
AbstractWe consider the following game played on a finite graph G. Let r and d be positive integers....