%0 Journal Article
%T Distance-based Topological Indices of Tensor Product of Graphs
%J Iranian Journal of Mathematical Chemistry
%I University of Kashan
%Z 2228-6489
%A Nadjafi-Arani, M. J.
%A Khodashenas, H.
%D 2012
%\ 02/01/2012
%V 3
%N 1
%P 45-53
%! Distance-based Topological Indices of Tensor Product of Graphs
%K tensor product
%K Wiener type invariant
%K Strongly triangular graph
%R 10.22052/ijmc.2012.5201
%X Let G and H be connected graphs. The tensor product G + H is a graph with vertex set V(G+H) = V (G) X V(H) and edge set E(G + H) ={(a , b)(x , y)| ax ∈ E(G) & by ∈ E(H)}. The graph H is called the strongly triangular if for every vertex u and v there exists a vertex w adjacent to both of them. In this article the tensor product of G + H under some distancebased topological indices are investigated, when H is a strongly triangular graph. As a special case most of results given by Hoji, Luob and Vumara in [Wiener and vertex PI indices of Kronecker products of graphs, Discrete Appl. Math., 158 (2010), 1848-1855] will be deduced.
%U