Let X be a finite connected graph, possibly with loops and multiple edges. An automorphism group of X acts purely harmonically if it acts freely on the set of directed edges of X and has no invertible edges. Dene a genus g of the graph X to be the rank of the first homology group. A finite group acting purely harmonically on a graph of genus g is a natural discrete analogue of a finite group of automorphisms acting on a Riemann surface of genus g: In the present paper, we investigate cyclic group Z<sub>n</sub> acting purely harmonically on a graph X of genus g with fixed points. Given subgroup Z<sub>d</Sub> < Z<sub>n</sub>; we find the signature of orbifold X=Z<sub>d</sub> through the signature of orbifold X=Z<sub>n</sub>: As a result, we obtain formulas for the number of fixed points for generators of group Z<sub>d</sub> and for genus of orbifold X=Z<sub>d</sub>: For Riemann surfaces, similar results were obtained earlier by M. J. Moore.
