Hexagonal and k-hexagonal graph's normalized Laplacian spectrum and applications
Abstract
Substituting each edge of a simple connected graph G by a path of length 1 and k paths of length 5 generates the k-hexagonal graph Hk(G). Iterative graph Hkn(G) is produced when the preceding constructions are repeated n times. According to the graph structure, we obtain a set of linear equations, and derive the entirely normalized Laplacian spectrum of Hkn(G) when k = 1 and k ≥slant 2 respectively by analyzing the structure of the solutions of these linear equations. We find significant formulas to calculate the Kemeny's constant, multiplicative degree-Kirchhoff index and number of spanning trees of Hkn(G) as applications.
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