Add to ORKGRamsey theory has to do with order within disorder. This thesis studies two Ramsey numbers, R(3; 3) and R(3; 4), to see if they can provide insight into finding larger Ramsey numbers. The numbers are studied with the help of computer programs. In the second part of the thesis we try to create a coloring of K45 which lacks monochromatic K5 and where each vertex has an equal degree for both color of edges. The results from studying R(3; 3) and R(3; 4) fail to give any further insight into larger Ramsey numbers. Every coloring of K45 we produce contains a monochromatic K5
Establishing the values of Ramsey numbers is, in general, a difficult task from the computational po...
We show that, in any coloring of the edges of K38 with two colors, there exists a triangle in the fi...
We study two classical problems in graph Ramsey theory, that of determining the Ramsey number of bou...
Ramsey theory has to do with order within disorder. This thesis studies two Ramsey numbers, R(3; 3) ...
Establishing the values of Ramsey numbers is, in general, a difficult task from the computational po...
Ramsey Theory states that there exists a Ramsey Number. This number is the minimum number of nodes n...
AbstractFor given graphs G1,G2,G3, the three-color Ramsey number R(G1,G2,G3) is defined to be the le...
Given a graph H, the Ramsey number r(H) is the smallest natural number N such that any two-colouring...
Given a graph H, the Ramsey number r(H) is the smallest natural number N such that any two-colouring...
AbstractSome computer programs used to generate Ramsey edge colorings of graphs are described. New r...
AbstractSome computer programs used to generate Ramsey edge colorings of graphs are described. New r...
This MSc thesis deals with a theory, which comes from combinatorics. According to Ramsey's theorem f...
We discuss some of our favorite open questions about Ramsey numbers and a related problem on edge Fo...
In 1930, Frank Ramsey showed that one will find a monochromatic clique of a specified size in any ed...
The Ramsey number r(G) of a graph G is the smallest number n such that, in any two-colouring of the ...
Establishing the values of Ramsey numbers is, in general, a difficult task from the computational po...
We show that, in any coloring of the edges of K38 with two colors, there exists a triangle in the fi...
We study two classical problems in graph Ramsey theory, that of determining the Ramsey number of bou...
Ramsey theory has to do with order within disorder. This thesis studies two Ramsey numbers, R(3; 3) ...
Establishing the values of Ramsey numbers is, in general, a difficult task from the computational po...
Ramsey Theory states that there exists a Ramsey Number. This number is the minimum number of nodes n...
AbstractFor given graphs G1,G2,G3, the three-color Ramsey number R(G1,G2,G3) is defined to be the le...
Given a graph H, the Ramsey number r(H) is the smallest natural number N such that any two-colouring...
Given a graph H, the Ramsey number r(H) is the smallest natural number N such that any two-colouring...
AbstractSome computer programs used to generate Ramsey edge colorings of graphs are described. New r...
AbstractSome computer programs used to generate Ramsey edge colorings of graphs are described. New r...
This MSc thesis deals with a theory, which comes from combinatorics. According to Ramsey's theorem f...
We discuss some of our favorite open questions about Ramsey numbers and a related problem on edge Fo...
In 1930, Frank Ramsey showed that one will find a monochromatic clique of a specified size in any ed...
The Ramsey number r(G) of a graph G is the smallest number n such that, in any two-colouring of the ...
Establishing the values of Ramsey numbers is, in general, a difficult task from the computational po...
We show that, in any coloring of the edges of K38 with two colors, there exists a triangle in the fi...
We study two classical problems in graph Ramsey theory, that of determining the Ramsey number of bou...