A study on Type-2 isomorphic circulant graphs. Part 10: Type-2 isomorphic Cnp3(R) w.r.t. m = p and related groups

Abstract

This study is the 10th part of a detailed study on Type-2 isomorphic circulant graphs having ten parts v2-1-v2-10. In this part, we obtain families of Type-2 isomorphic circulant graphs Cnp3(R) w.r.t. m = p, and related Abelian groups where p is a prime number and n∈N. In its main theorem, it is proved that for i = 1 to p, circulant graphs Cnp3(Rnp3,x+ypi) are isomorphic of Type-2 w.r.t. m = p and they form Abelian group (T2np3,p(Cnp3(Rnp3,x+ypi)), ) where T2np3,p(Cnp3(Rnp3,x+ypi)) = \θnp3,p,jn(Cnp3(Rnp3,x+ypi)) = Cnp3(Rnp3,x+ypi+j) : j = 0,1,...,p-1 and i+j in Cnp3(Rnp3,x+ypi+j) is calculated under addition modulo p \, 1 ≤ x ≤ p-1, 0 ≤ y ≤ np - 1, 1 ≤ x+yp ≤ np2-1, y∈N0, p,np3-p∈ Rnp3,x+ypi and i,n,x∈N. And using it, a list of T2np3,p(Cnp3(Rnp3,x+ypi)), each containing p isomorphic circulant graphs Cnp3(Rnp3,x+ypi) of Type-2 w.r.t. m = p, for p = 3,5,7, n = 1,2 and y = 0 is given in the Annexure and more such families of Type-2 isomorphic circulant graphs are presented in v24.