The Laplacian spectrum, Kirchhoff index and complexity of the linear heptagonal networks

Abstract

Let Hn be the linear heptagonal networks with 2n heptagons. We study the structure properties and the eigenvalues of the linear heptagonal networks. According to the Laplacian polynomial of Hn, we utilize the decomposition theorem. Thus, the Laplacian spectrum of Hn is created by eigenvalues of a pair of matrices: LA and LS of order number 5n+1 and 4n+1, respectively. On the basis of the roots and coefficients of their characteristic polynomials of LA and LS, we not only get the explicit forms of Kirchhoff index, but also corresponding total complexity of Hn.