As a continuation of computing the zeta function of a regular covering graph by Mizuno and Sato in [9], we derive in this paper computational formulae for the zeta functions of a graph bundle and of any (regular or irregular) covering of a graph. If the voltages to derive them lie in an abelian or dihedral group and its fibre is a regular graph, those formulae can be simplified. As a by-product, the zeta function of the Cartesian product of a graph and a regular graph is obtained. The same work is also done for a discrete torus and for a discrete Klein bottle.Mathematics, AppliedMathematicsSCI(E)2ARTICLE61269-12874
AbstractWe express the (Bartholdi type) L-functions of the line graph and the middle graph of a regu...
AbstractWe give a decomposition formula for the weighted zeta function of a regular covering of a gr...
AbstractWe define a weighted zeta function of a digraph and a weighted L-function of a symmetric dig...
AbstractAs a continuation of computing the Bartholdi zeta function of a regular covering of a graph ...
AbstractThree different zeta functions are attached to a finite connected, possibly irregular graphX...
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...
AbstractSuppose Y is a regular covering of a finite graph X with covering transformation group π=Z. ...
We consider the (Ihara) zeta functions of line graphs, middle graphs and total graphs of a regular g...
We consider the zeta functions of the line graph and the middle graph of a regular covering of a gra...
AbstractWe give a decomposition formula for the Bartholdi zeta function of a regular covering of a g...
AbstractWe give a decomposition formula of the zeta function of a regular covering of a graph G with...
Abstract. A graph theoretical analogue of Brauer-Siegel theory for zeta func-tions of number \u85eld...
AbstractA graph theoretical analog of Brauer–Siegel theory for zeta functions of number fields is de...
AbstractWe give a decomposition formula for the zeta function of a group covering of a graph
AbstractWe express the (Bartholdi type) L-functions of the line graph and the middle graph of a regu...
AbstractWe give a decomposition formula for the weighted zeta function of a regular covering of a gr...
AbstractWe define a weighted zeta function of a digraph and a weighted L-function of a symmetric dig...
AbstractAs a continuation of computing the Bartholdi zeta function of a regular covering of a graph ...
AbstractThree different zeta functions are attached to a finite connected, possibly irregular graphX...
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...
AbstractSuppose Y is a regular covering of a finite graph X with covering transformation group π=Z. ...
We consider the (Ihara) zeta functions of line graphs, middle graphs and total graphs of a regular g...
We consider the zeta functions of the line graph and the middle graph of a regular covering of a gra...
AbstractWe give a decomposition formula for the Bartholdi zeta function of a regular covering of a g...
AbstractWe give a decomposition formula of the zeta function of a regular covering of a graph G with...
Abstract. A graph theoretical analogue of Brauer-Siegel theory for zeta func-tions of number \u85eld...
AbstractA graph theoretical analog of Brauer–Siegel theory for zeta functions of number fields is de...
AbstractWe give a decomposition formula for the zeta function of a group covering of a graph
AbstractWe express the (Bartholdi type) L-functions of the line graph and the middle graph of a regu...
AbstractWe give a decomposition formula for the weighted zeta function of a regular covering of a gr...
AbstractWe define a weighted zeta function of a digraph and a weighted L-function of a symmetric dig...