Wiener–Hosoya Matrix of Connected Graphs

Let G be a connected (molecular) graph with the vertex set V ( G ) = { v 1 , ⋯ , v n } , and let d i and σ i denote, respectively, the vertex degree and the transmission of v i , 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 σ i 2 d i + σ j 2 d j if v i and v j 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.