Study on the normalized Laplacian of a penta‐graphene with applications
Qishun Li, Shahid Zaman, Wanting Sun, Jawad Alam
Abstract
Abstract Let L n denote a linear pentagonal chain with 2 n pentagons. The penta‐graphene (penta‐C), denoted by R n is the graph obtained from L n by identifying the opposite lateral edges in an ordered way, whereas the pentagonal Möbius ring is the graph obtained from the L n by identifying the opposite lateral edges in a reversed way. In this paper, through the decomposition theorem of the normalized Laplacian characteristic polynomial and the relationship between its roots and the coefficients, an explicit closed‐form formula of the multiplicative degree‐Kirchhoff index (resp. Kemeny's constant, the number of spanning trees) of R n is obtained. Furthermore, it is interesting to see that the multiplicative degree‐Kirchhoff index of R n is approximately of its Gutman index. Based on our obtained results, all the corresponding results are obtained for .