Focuses on problems involving colored objects, and results about the existence of certain exciting and unexpected properties that occur regardless of how these objects are colored. This book also addresses famous and exciting problems of Ramsey Theory, along with the history surrounding the discovery of Ramsey Theory
Ramsey theory is a fast-growing area of combinatorics with deep connections to other fields of mathe...
A set of n triangles sharing a common edge is called a book with n pages and is denoted by Bn. It is...
This MSc thesis deals with a theory, which comes from combinatorics. According to Ramsey's theorem f...
Ramsey theory is the study of the structure of mathematical objects that is preserved under partitio...
This BCs thesis deals with topics from graph theory. Ramsey theory in its most basic form deals with...
A graph is a general mathematical structure that displays connections between different objects. The...
noneThe game of Sim, invented by Gustavus Simmons, matches Red against Blue on a hexagonal field of ...
In this thesis, we present new results which are concerned with the following four coloring problems...
Beginning with the origin of the four color problem in 1852, the field of graph colorings has develo...
Ramsey theory studies the internal homogenity of mathematical structures (graphs, number sets), part...
This book takes the reader on a journey through Ramsey theory, from graph theory and combinatorics t...
AbstractIn this article, we consider the relations between colourings and some equations in finite g...
Ramsey theory studies the internal homogenity of mathematical structures (graphs, number sets), part...
Euclidean Ramsey theory is examining konfigurations of points, for which there exists n such that fo...
Graph Ramsey Theory is a mathematical study of order amid chaos. In an edge-colored graph, we consid...
Ramsey theory is a fast-growing area of combinatorics with deep connections to other fields of mathe...
A set of n triangles sharing a common edge is called a book with n pages and is denoted by Bn. It is...
This MSc thesis deals with a theory, which comes from combinatorics. According to Ramsey's theorem f...
Ramsey theory is the study of the structure of mathematical objects that is preserved under partitio...
This BCs thesis deals with topics from graph theory. Ramsey theory in its most basic form deals with...
A graph is a general mathematical structure that displays connections between different objects. The...
noneThe game of Sim, invented by Gustavus Simmons, matches Red against Blue on a hexagonal field of ...
In this thesis, we present new results which are concerned with the following four coloring problems...
Beginning with the origin of the four color problem in 1852, the field of graph colorings has develo...
Ramsey theory studies the internal homogenity of mathematical structures (graphs, number sets), part...
This book takes the reader on a journey through Ramsey theory, from graph theory and combinatorics t...
AbstractIn this article, we consider the relations between colourings and some equations in finite g...
Ramsey theory studies the internal homogenity of mathematical structures (graphs, number sets), part...
Euclidean Ramsey theory is examining konfigurations of points, for which there exists n such that fo...
Graph Ramsey Theory is a mathematical study of order amid chaos. In an edge-colored graph, we consid...
Ramsey theory is a fast-growing area of combinatorics with deep connections to other fields of mathe...
A set of n triangles sharing a common edge is called a book with n pages and is denoted by Bn. It is...
This MSc thesis deals with a theory, which comes from combinatorics. According to Ramsey's theorem f...