Identifying vertices in graphs and digraphs

Skaggs, Robert Duane

28 February 2007

The closed neighbourhood of a vertex in a graph is the vertex together with the set of adjacent vertices. A di®erentiating-dominating set, or identifying code, is a collection of vertices whose intersection with the closed neighbour- hoods of each vertex is distinct and nonempty. A di®erentiating-dominating set in a graph serves to uniquely identify all the vertices in the graph. Chapter 1 begins with the necessary de¯nitions and background results and provides motivation for the following chapters. Chapter 1 includes a summary of the lower identi¯cation parameters, °L and °d. Chapter 2 de- ¯nes co-distinguishable graphs and determines bounds on the number of edges in graphs which are distinguishable and co-distinguishable while Chap- ter 3 describes the maximum number of vertices needed in order to identify vertices in a graph, and includes some Nordhaus-Gaddum type results for the sum and product of the di®erentiating-domination number of a graph and its complement. Chapter 4 explores criticality, in which any minor modi¯cation in the edge or vertex set of a graph causes the di®erentiating-domination number to change. Chapter 5 extends the identi¯cation parameters to allow for orientations of the graphs in question and considers the question of when adding orientation helps reduce the value of the identi¯cation parameter. We conclude with a survey of complexity results in Chapter 6 and a collection of interesting new research directions in Chapter 7. / Mathematical Sciences / PhD (Mathematics)

Oriented graph

Nordhaus-Gaddum results

Graph complement

Criticality

Identifying code

Domination

Graph theory

511.5

Graph theory

Graphic methods

Directed graphs

Identifying vertices in graphs and digraphs

Skaggs, Robert Duane

28 February 2007

The closed neighbourhood of a vertex in a graph is the vertex together with the set of adjacent vertices. A di®erentiating-dominating set, or identifying code, is a collection of vertices whose intersection with the closed neighbour- hoods of each vertex is distinct and nonempty. A di®erentiating-dominating set in a graph serves to uniquely identify all the vertices in the graph. Chapter 1 begins with the necessary de¯nitions and background results and provides motivation for the following chapters. Chapter 1 includes a summary of the lower identi¯cation parameters, °L and °d. Chapter 2 de- ¯nes co-distinguishable graphs and determines bounds on the number of edges in graphs which are distinguishable and co-distinguishable while Chap- ter 3 describes the maximum number of vertices needed in order to identify vertices in a graph, and includes some Nordhaus-Gaddum type results for the sum and product of the di®erentiating-domination number of a graph and its complement. Chapter 4 explores criticality, in which any minor modi¯cation in the edge or vertex set of a graph causes the di®erentiating-domination number to change. Chapter 5 extends the identi¯cation parameters to allow for orientations of the graphs in question and considers the question of when adding orientation helps reduce the value of the identi¯cation parameter. We conclude with a survey of complexity results in Chapter 6 and a collection of interesting new research directions in Chapter 7. / Mathematical Sciences / PhD (Mathematics)

Oriented graph

Nordhaus-Gaddum results

Graph complement

Criticality

Identifying code

Domination

Graph theory

511.5

Graph theory

Graphic methods

Directed graphs