Terminal Wiener Index of Line Graphs - MATCH Communications in ...
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Terminal Wiener Index of Line Graphs - MATCH Communications in ...
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MATCH Communications in Mathematical and in Computer Chemistry
MATCH Commun. Math. Comput. Chem. 69 (2013) 775-782
ISSN 0340 - 6253
Terminal Wiener Index of Line Graphs Harishchandra S. Ramane1 , Kishori P. Narayankar2 , Shailaja S. Shirkol3 , Asha B. Ganagi1 1
Department of Mathematics, Mangalore University, Mangalore - 574199, India, kishori [email protected]
Department of Mathematics, Vishwanath Rao Deshpande Rural Institute of Technology, Haliyal - 581329, India, shaila [email protected] (Received August 8, 2012)
Abstract The terminal Wiener index of a graph is defined as the sum of the distances between the pendent vertices of a graph. In this paper we obtain results for the terminal Wiener index of line graphs.
1. Introduction Let G be a connected graph with vertex set V (G) = {v1 , v2 , . . . , vn } and edge set E(G) = {e1 , e2 , . . . , em }. The degree of a vertex v in G is the number of edges incident to it and is denoted by degG (v). If degG (v) = 1 then v is called a pendent vertex . An edge e = uv of a graph G is called a pendent edge if degG (u) = 1 or degG (v) = 1. Two edges are said to be independent if they are not adjacent to each other. An edge e is called a bridge if removal of e from G increases the number of components. The distance between the vertices vi and vj in G is equal to the length of a shortest path joining them and is denoted by d(vi , vj |G).
-776The Wiener index W = W (G) of a graph G is defined as the sum of the distances between all pairs of vertices of G, that is, W = W (G) =
