AIMS Mathematics (Apr 2024)

Analyzing the normalized Laplacian spectrum and spanning tree of the cross of the derivative of linear networks

  • Ze-Miao Dai ,
  • Jia-Bao Liu,
  • Kang Wang

DOI
https://doi.org/10.3934/math.2024710
Journal volume & issue
Vol. 9, no. 6
pp. 14594 – 14617

Abstract

Read online

In this paper, we focus on the strong product of the pentagonal networks. Let $ R_{n} $ be a hexagonal network composed of $ 2n $ pentagons and $ n $ quadrilaterals. Let $ P_{n}^{2} $ denote the graph formed by the strong product of $ R_{n} $ and its copy $ R_{n}^{\prime} $. By utilizing the decomposition theorem of the normalized Laplacian characteristics polynomial, we characterize the explicit formula of the multiplicative degree-Kirchhoff index completely. Moreover, the complexity of $ P_{n}^{2} $ is determined.

Keywords