In Chapter I, a brief history of expander graphs will be discussed. In Chapter II, I will introduce many elementary terms and concepts related to graphs and graph covers. Subsequently, in Chapter III, I will study logarithmic derivatives of L-functions associated to graph covers. In this chapter I will show how to use the representations associated to a graph covering, to determine the number of paths which split completely in a given cover. In Chapter IV, an explicit formula for graph zeta functions will be presented. Subsequently I will combine elements of the previous chapter to deduce an explicit formula for graph L -functions. In the next chapter, the subject of the universal cover of a graph and its spectrum will be discussed. A resul...
Since a zeta function of a regular graph was introduced by Ihara [Y. Ihara, On discrete subgroups of...
We consider the zeta functions of the line graph and the middle graph of a regular covering of a gra...
AbstractWe define the weighted Bartholdi zeta function and a weighted L-function of a graph G, and g...
In Chapter I, a brief history of expander graphs will be discussed. In Chapter II, I will introduce ...
AbstractWe give a decomposition formula for the Bartholdi zeta function of a regular covering of a g...
AbstractWe express the L-functions of the line graph and the middle graph of a regular covering of a...
We consider the (Ihara) zeta functions of line graphs, middle graphs and total graphs of a regular g...
AbstractWe express the (Bartholdi type) L-functions of the line graph and the middle graph of a regu...
AbstractThree different zeta functions are attached to a finite connected, possibly irregular graphX...
AbstractA graph theoretical analog of Brauer–Siegel theory for zeta functions of number fields is de...
AbstractWe extend Watanabe and Fukumizu’s Theorem on the edge zeta function to a regular covering of...
Abstract. A graph theoretical analogue of Brauer-Siegel theory for zeta func-tions of number \u85eld...
As a continuation of computing the zeta function of a regular covering graph by Mizuno and Sato in [...
AbstractSuppose Y is a regular covering of a finite graph X with covering transformation group π=Z. ...
AbstractSince a zeta function of a regular graph was introduced by Ihara [Y. Ihara, On discrete subg...
Since a zeta function of a regular graph was introduced by Ihara [Y. Ihara, On discrete subgroups of...
We consider the zeta functions of the line graph and the middle graph of a regular covering of a gra...
AbstractWe define the weighted Bartholdi zeta function and a weighted L-function of a graph G, and g...
In Chapter I, a brief history of expander graphs will be discussed. In Chapter II, I will introduce ...
AbstractWe give a decomposition formula for the Bartholdi zeta function of a regular covering of a g...
AbstractWe express the L-functions of the line graph and the middle graph of a regular covering of a...
We consider the (Ihara) zeta functions of line graphs, middle graphs and total graphs of a regular g...
AbstractWe express the (Bartholdi type) L-functions of the line graph and the middle graph of a regu...
AbstractThree different zeta functions are attached to a finite connected, possibly irregular graphX...
AbstractA graph theoretical analog of Brauer–Siegel theory for zeta functions of number fields is de...
AbstractWe extend Watanabe and Fukumizu’s Theorem on the edge zeta function to a regular covering of...
Abstract. A graph theoretical analogue of Brauer-Siegel theory for zeta func-tions of number \u85eld...
As a continuation of computing the zeta function of a regular covering graph by Mizuno and Sato in [...
AbstractSuppose Y is a regular covering of a finite graph X with covering transformation group π=Z. ...
AbstractSince a zeta function of a regular graph was introduced by Ihara [Y. Ihara, On discrete subg...
Since a zeta function of a regular graph was introduced by Ihara [Y. Ihara, On discrete subgroups of...
We consider the zeta functions of the line graph and the middle graph of a regular covering of a gra...
AbstractWe define the weighted Bartholdi zeta function and a weighted L-function of a graph G, and g...