AbstractIn 1989, Hashimoto introduced an edge zeta function of a finite graph, which is a generalization of the Ihara zeta function. The edge zeta function is the reciprocal of a polynomial in twice as many indeterminants as edges in the graph and can be computed via a determinant expression. We look at graph properties which we can determine using the edge zeta function. In particular, the edge zeta function is enough to deduce the clique number, the number of Hamiltonian cycles, and whether a graph is perfect or chordal. Finally, we present a new example illustrating that the Ihara zeta function cannot necessarily do the same
AbstractWe extend Watanabe and Fukumizu’s Theorem on the edge zeta function to a regular covering of...
AbstractIhara’s formula expresses the Ihara zeta function of a finite undirected graph as a rational...
In this paper, we give a more direct proof of the results by Clair and Mokhtari-Sharghi [B. Clair, S...
AbstractIn 1989, Hashimoto introduced an edge zeta function of a finite graph, which is a generaliza...
We explore three seemingly disparate but related avenues of inquiry: expanding what is known about t...
Poles of the Ihara zeta function associated with a finite graph are described by graph-theoretic qua...
AbstractThree different zeta functions are attached to a finite connected, possibly irregular graphX...
Poles of the {\it Ihara zeta function} associated with a finite graph are described by graph-theoret...
First defined in 1966, the Ihara zeta function has been an important tool in the study of graphs for...
The definition and main properties of the Ihara zeta function for graphs are reviewed, focusing main...
Starting with Ihara's work in 1968, there has been a growing interest in the study of zeta functions...
We show that if a graph G has average degree d ≥ 4, then the Ihara zeta function of G is edge-recons...
AbstractAfter defining and exploring some of the properties of Ihara zeta functions of digraphs, we ...
The location of the nontrivial poles of a generalized zeta function is derived from the spectrum of ...
The definitions and main properties of the Ihara and Bartholdi zeta functions for infinite graphs ar...
AbstractWe extend Watanabe and Fukumizu’s Theorem on the edge zeta function to a regular covering of...
AbstractIhara’s formula expresses the Ihara zeta function of a finite undirected graph as a rational...
In this paper, we give a more direct proof of the results by Clair and Mokhtari-Sharghi [B. Clair, S...
AbstractIn 1989, Hashimoto introduced an edge zeta function of a finite graph, which is a generaliza...
We explore three seemingly disparate but related avenues of inquiry: expanding what is known about t...
Poles of the Ihara zeta function associated with a finite graph are described by graph-theoretic qua...
AbstractThree different zeta functions are attached to a finite connected, possibly irregular graphX...
Poles of the {\it Ihara zeta function} associated with a finite graph are described by graph-theoret...
First defined in 1966, the Ihara zeta function has been an important tool in the study of graphs for...
The definition and main properties of the Ihara zeta function for graphs are reviewed, focusing main...
Starting with Ihara's work in 1968, there has been a growing interest in the study of zeta functions...
We show that if a graph G has average degree d ≥ 4, then the Ihara zeta function of G is edge-recons...
AbstractAfter defining and exploring some of the properties of Ihara zeta functions of digraphs, we ...
The location of the nontrivial poles of a generalized zeta function is derived from the spectrum of ...
The definitions and main properties of the Ihara and Bartholdi zeta functions for infinite graphs ar...
AbstractWe extend Watanabe and Fukumizu’s Theorem on the edge zeta function to a regular covering of...
AbstractIhara’s formula expresses the Ihara zeta function of a finite undirected graph as a rational...
In this paper, we give a more direct proof of the results by Clair and Mokhtari-Sharghi [B. Clair, S...