More on total domination polynomial and Dt-equivalence classes of some graphs
Abstract
Let G = (V, E) be a simple graph of order n. The total dominating set of G is a subset D of V that every vertex of V is adjacent to some vertices of D. The total domination number of G is equal to minimum cardinality of total dominating set in G and is denoted by γt(G). The total domination polynomial of G is the polynomial Dt(G,x)=Σi=γt(G)n dt(G,i)xi, where dt(G,i) is the number of total dominating sets of G of size i. Two graphs G and H are said to be total dominating equivalent or simply Dt-equivalent, if Dt(G,x)=Dt(H,x). The equivalence class of G, denoted [G], is the set of all graphs Dt-equivalent to G. In this paper, we investigate Dt-equivalence classes of some graphs. Also we introduce some families of graphs whose total domination polynomials are unimodal.
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