On extremal multiplicative Zagreb indices of trees with given domination number

Abstract

For a graph G, the first multiplicative Zagreb index Π1 is equal to the product of squares of the vertex degrees, and the second multiplicative Zagreb index Π2 is equal to the product of the products of degrees of pairs of adjacent vertices. The (mutiplicative) Zagreb indices have been the focus of considerable research in computational chemistry dating back to Gutman and Trinajsti\'c in 1972. In this paper, we explore the mutiplicative Zagreb indices in terms of arbitrary domination number. The sharp upper and lower bounds of Π1(G) and Π2(G) are given. In addition, the corresponding extreme graphs are charaterized.