On the roots of total domination polynomial of 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 denoted by γt(G). The total domination polynomial of G is the polynomial Dt(G,x)=Σi=γt(G)n dt(G,i), where dt(G,i) is the number of total dominating sets of G of size i. In this paper, we study roots of total domination polynomial of some graphs. We show that all roots of Dt(G, x) lie in the circle with center (-1, 0) and the radius [δ]2n-1, where δ is the minimum degree of G. As a consequence we prove that if δ≥ 2n3, then every integer root of Dt(G, x) lies in the set \-3,-2,-1,0\.