Domination polynomial of clique cover product of graphs

Abstract

Let G be a simple graph of order n. The domination polynomial of G is the polynomial D(G, x)=Σi=1n d(G,i) xi, where d(G,i) is the number of dominating sets of G of size i. For two graphs G and H, let C = \C1,C2, ·s, Ck\ be a clique cover of G and U⊂eq V(H). We consider clique cover product which denoted by GC HU and obtained from G as follows: for each clique Ci ∈ C, add a copy of the graph H and join every vertex of Ci to every vertex of U. We prove that the domination polynomial of clique cover product GC HV(H) or simply GC H is \[ D(GC H,x)=Πi=1k [((1+x)ni-1)(1+x)|V(H)|+D(H,x)], \] where each clique Ci ∈ C has ni vertices. As results, we study the D-equivalence classes of some families of graphs. Also we completely describe the D-equivalence classes of friendship graphs constructed by coalescence n copies of the cycle graph of length three with a common vertex.