On the sum of the largest $A_α$-eigenvalues of graphs (2012.11177v1)

Abstract: For every real $0\leq \alpha \leq 1$, Nikiforov defined the $A_{\alpha}$-matrix of a graph $G$ as $A_{\alpha}(G)=\alpha D(G)+(1-\alpha)A(G)$, where $A(G)$ and $D(G)$ are the adjacency matrix and the degree diagonal matrix of a graph $G$, respectively. The eigenvalues of $A_{\alpha}(G)$ are called the $A_{\alpha}$-eigenvalues of $G$. Let $S_k(A_{\alpha}(G))$ be the sum of $k$ largest $A_{\alpha}$-eigenvalues of $G$. In this paper, we present several upper and lower bounds on $S_k(A_{\alpha}(G))$ and characterize the extremal graphs for certain cases, which can be regard as a common generalization of the sum of $k$ largest eigenvalues of adjacency matrix and signless Laplacian matrix of graphs. In addition, some graph operations on $S_k(A_{\alpha}(G))$ are presented.