The vertex-edge Wiener index of a simple connected graph G is defined as the sum of distances between vertices and edges of G. Two possible distances D_1(u,e|G) and D_2(u,e|G) between a vertex u and an edge e of G were considered in the literature and according to them, the corresponding vertex-edge Wiener indices W_{ve_1}(G) and W_{ve_2}(G) were introduced. In this paper, we present exact formulas for computing the vertex-edge Wiener indices of two composite graphs named splice and link.
Azari, M. (2016). A Note on Vertex-Edge Wiener Indices of Graphs. Iranian Journal of Mathematical Chemistry, 7(1), 11-17. doi: 10.22052/ijmc.2016.11865
MLA
M. Azari. "A Note on Vertex-Edge Wiener Indices of Graphs", Iranian Journal of Mathematical Chemistry, 7, 1, 2016, 11-17. doi: 10.22052/ijmc.2016.11865
HARVARD
Azari, M. (2016). 'A Note on Vertex-Edge Wiener Indices of Graphs', Iranian Journal of Mathematical Chemistry, 7(1), pp. 11-17. doi: 10.22052/ijmc.2016.11865
VANCOUVER
Azari, M. A Note on Vertex-Edge Wiener Indices of Graphs. Iranian Journal of Mathematical Chemistry, 2016; 7(1): 11-17. doi: 10.22052/ijmc.2016.11865
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