On Spectral Radius and Energy of a Graph with Self-Loops
Document Type
Article
Publication Title
Mathematical Problems in Engineering
Abstract
The spectral radius of a square matrix is the maximum among absolute values of its eigenvalues. Suppose a square matrix is nonnegative; then, by Perron-Frobenius theory, it will be one among its eigenvalues. In this paper, Perron-Frobenius theory for adjacency matrix of graph with self-loops AGS will be explored. Specifically, it discusses the nontrivial existence of Perron-Frobenius eigenvalue and eigenvector pair in the matrix AGS-σnI, where σ denotes the number of self-loops. Also, Koolen-Moulton type bound for the energy of graph GS is explored. In addition, the existence of a graph with self-loops for every odd energy is proved.
DOI
10.1155/2024/7056478
Publication Date
1-1-2024
Recommended Citation
Vivek Anchan, Deekshitha; Gowtham, H. J.; and D'Souza, Sabitha, "On Spectral Radius and Energy of a Graph with Self-Loops" (2024). Open Access archive. 6967.
https://impressions.manipal.edu/open-access-archive/6967
