Add to ORKGIn this thesis we shall introduce two interesting topics from graph theory and begin to explore what happens when we combine these together. We will be focusing on an area known as graph colouring and assessing it alongside a very unique set of graphs called graceful graphs. The two topic areas, although not mixed together often, nicely support each other in introducing various findings from each of the topics. We will start by investigating graceful graphs and determining what classes of graph can be deemed to be graceful, before introducing some of the fundamentals of graph colouring. Following this we can then begin to investigate the two topics combined and will see a whole range of results, including some fascinating less well known di...
Colour is one of the primary aesthetic elements of a visualization. It is often used successfully to...
A simple graph is said to be a vertex -graceful if there exists a vertex graceful labeling on the ...
Graceful graphs were first studied by Rosa in 1966. The Kotzig-Ringel graceful tree conjecture state...
In this thesis we shall introduce two interesting topics from graph theory and begin to explore what...
A graceful labeling of a graph G with m edges is a function f: V (G) ! f0; : : : ; mg such that dist...
Graph labeling is an assignment of integers to the vertices and/or edges of a graph, subject to cert...
This book describes kaleidoscopic topics that have developed in the area of graph colorings. Unifyin...
This paper presents a pattern of labeling for some special graceful graphs like paths, cycles, compl...
This book provides an up-to-date and rapid introduction to an important and currently active topic i...
A graph with m edges is defined to be graceful if its vertices can be labeled using the integers 0,1...
A comprehensive treatment of color-induced graph colorings is presented in this book, emphasizing ve...
Let M={1,2,..m} and G be a simple graph. A graceful m-coloring of G is a proper vertex coloring of G...
summary:A proper coloring $c\colon V(G)\to \{1, 2,\ldots , k\}$, $k\ge 2$ of a graph $G$ is called ...
Abstract. A simple graph G is a graceful graph if there exists a graceful labeling of the vertices o...
The Graceful Tree Conjecture is a problem in graph theory that dates back to 1967. It suggests that...
Colour is one of the primary aesthetic elements of a visualization. It is often used successfully to...
A simple graph is said to be a vertex -graceful if there exists a vertex graceful labeling on the ...
Graceful graphs were first studied by Rosa in 1966. The Kotzig-Ringel graceful tree conjecture state...
In this thesis we shall introduce two interesting topics from graph theory and begin to explore what...
A graceful labeling of a graph G with m edges is a function f: V (G) ! f0; : : : ; mg such that dist...
Graph labeling is an assignment of integers to the vertices and/or edges of a graph, subject to cert...
This book describes kaleidoscopic topics that have developed in the area of graph colorings. Unifyin...
This paper presents a pattern of labeling for some special graceful graphs like paths, cycles, compl...
This book provides an up-to-date and rapid introduction to an important and currently active topic i...
A graph with m edges is defined to be graceful if its vertices can be labeled using the integers 0,1...
A comprehensive treatment of color-induced graph colorings is presented in this book, emphasizing ve...
Let M={1,2,..m} and G be a simple graph. A graceful m-coloring of G is a proper vertex coloring of G...
summary:A proper coloring $c\colon V(G)\to \{1, 2,\ldots , k\}$, $k\ge 2$ of a graph $G$ is called ...
Abstract. A simple graph G is a graceful graph if there exists a graceful labeling of the vertices o...
The Graceful Tree Conjecture is a problem in graph theory that dates back to 1967. It suggests that...
Colour is one of the primary aesthetic elements of a visualization. It is often used successfully to...
A simple graph is said to be a vertex -graceful if there exists a vertex graceful labeling on the ...
Graceful graphs were first studied by Rosa in 1966. The Kotzig-Ringel graceful tree conjecture state...