On D-equivalence classes of some 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. The n-barbell graph Barn with 2n vertices, is formed by joining two copies of a complete graph Kn by a single edge. We prove that for every n≥ 2, Barn is not D-unique, that is, there is another non-isomorphic graph with the same domination polynomial. More precisely, we show that for every n, the D-equivalence class of barbell graph, [Barn], contains many graphs, which one of them is the complement of book graph of order n-1, Bn-1c. Also we present many families of graphs in D-equivalence class of Kn1 Kn2 ·s Knk.