The normalized Laplacians and random walks of the parallel subdivision graphs

Abstract

The k-parallel subdivision graph Sk(G) is generated from G which each edge of G is replaced by k parallel paths of length 2. The 2k-parallel subdivision graph S2k(G) is constructed from G which each edge of G is replaced by k parallel paths of length 3. In this paper, the normalized Laplacian spectra of Sk(G) and S2k(G) are given. They turn out that the multiplicities of the corresponding eigenvalues are only determined by k. As applications, the expected hitting time, the expected commute time and any two-points resistance distance between vertices i and j of Sk(G), the normalized Laplacian spectra of Sk(G) and S2k(G) with r iterations are given. Moreover, the multiplicative degree Kirchhoff index, Kemeny's constant and the number of spanning tress of Sk(G), Skr(G), S2k(G) and S2kr(G) are respectively obtained. Our results have generalized the previous works in Xie et al. and Guo et al. respectively.