%0 Journal Article
%T Computing Chemical Properties of Molecules by Graphs and Rank Polynomials
%J Iranian Journal of Mathematical Chemistry
%I University of Kashan
%Z 2228-6489
%A MOGHARRAB, M.
%A FATH-TABAR, G. H.
%D 2012
%\ 12/01/2012
%V 3
%N Supplement 1
%P 59-65
%! Computing Chemical Properties of Molecules by Graphs and Rank Polynomials
%K Dendrimers
%K Tutte polynomial
%K PI-polynomial
%R 10.22052/ijmc.2012.5276
%X The topological index of a graph G is a numeric quantity related to G which is invariant under automorphisms of G. The Tutte polynomial of is a polynomial in two variables defined for every undirected graph contains information about connectivity of the graph. The Padmakar-Ivan, vertex Padmakar-Ivan polynomials of a graph are polynomials in one variable defined for every simple connected graphs that are undirected. In this paper, we compute these polynomials of two infinite classes of dendrimer nanostars.
%U https://ijmc.kashanu.ac.ir/article_5276_79a271992b7bcfde9d597fe6eba83405.pdf