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Title
Wiener–Hosoya Matrix of Connected Graphs
Type Article
Keywords
transmission; vertex-degree; Wiener index; spectral radius, energy
Abstract
Let G be a connected (molecular) graph with the vertex set V(G)={v1,⋯,vn}, and let di and σi denote, respectively, the vertex degree and the transmission of vi, for 1≤i≤n. In this paper, we aim to provide a new matrix description of the celebrated Wiener index. In fact, we introduce the Wiener–Hosoya matrix of G, which is defined as the n×n matrix whose (i,j)-entry is equal to σi2di+σj2dj if vi and vj are adjacent and 0 otherwise. Some properties, including upper and lower bounds for the eigenvalues of the Wiener–Hosoya matrix are obtained and the extremal cases are described. Further, we introduce the energy of this matrix.
Researchers Hassan Ibrahim (First researcher) , Reza Sharafdini (Second researcher) , Tamas Reti (Third researcher) , Abolape Akwu (Fourth researcher)