On the largest Aα-spectral radius of cacti

Abstract

Let A(G) be the adjacent matrix and D(G) the diagonal matrix of the degrees of a graph G, respectively. For 0 ≤ α ≤ 1, the Aα matrix Aα(G) = α D(G) +(1-α)A(G) is given by Nikiforov. Clearly, A0 (G) is the adjacent matrix and 2 A12 is the signless Laplacian matrix. A cactus is a connected graph such that any two of its cycles have at most one common vertex, that is an extension of the tree. The Aα-spectral radius of a cactus graph with n vertices and k cycles is explored. The outcomes obtained in this paper can imply previous bounds of Nikiforov et al., and Lov\'asz and Pelik\'an. In addition, the corresponding extremal graphs are determined. Furthermore, we proposed all eigenvalues of such extremal cacti. Our results extended and enriched previous known results.