The Laplacians, Kirchhoff index and complexity of linear M\"obius and cylinder octagonal-quadrilateral networks

Abstract

Spectrum graph theory not only facilitate comprehensively reflect the topological structure and dynamic characteristics of networks, but also offer significant and noteworthy applications in theoretical chemistry, network science and other fields. Let Ln8,4 represent a linear octagonal-quadrilateral network, consisting of n eight-member ring and n four-member ring. The M\"obius graph Qn(8,4) is constructed by reverse identifying the opposite edges, whereas cylinder graph Q'n(8,4) identifies the opposite edges by order. In this paper, the explicit formulas of Kirchhoff indices and complexity of Qn(8,4) and Q'n(8,4) are demonstrated by Laplacian characteristic polynomials according to decomposition theorem and Vieta's theorem. In surprise, the Kirchhoff index of Qn(8,4)(Q'n(8,4)) is approximately one-third half of its Wiener index as n∞.

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