PRODUCTS OF CIRCULANT GRAPHS

Abstract

Graph products of circulants are studied. It is shown that if G and H are circulants and gcd(v(G), v(H)) = 1, then every B-product of G and H is again a circulant. We prove that if m ≠ 2, then the generalised prism K₂ ^mxC_n is a circulant iff n is odd. A similar result is deduced for the conjunction. We also prove that C_p x C_q is a circulant iff p and q are relatively prime. We close by showing that the composition of two circulants is again a circulant and explicitly describe the resultant circulant's jump sequence in terms of the constituent circulants' jump sequences.