Exploring new upper and lower bounds for the Aα-energy of graphs

Abstract

Let G be a graph on n vertices and m edges. For α ∈ [0,1], the Aα-matrix of G is defined as Aα(G) = α D(G) + (1- α) A(G), where A(G) is the adjacency matrix and D(G) is the degree diagonal matrix of G. If 1 ≥ 2 … ≥ n are the eigenvalues of Aα(G), the Aα-energy of G is defined as EAα(G) = Σi=1n |i -2α mn|. In this paper, we present novel upper and lower bounds for EAα(G) in terms of standard graph invariants, showing that each bound is sharp and identifying the specific graphs attaining them. For selected bounds, we provide brief comparative analysis with existing results, observing improved estimates. Furthermore, we establish new relations between EAα(G) and other well known graph energies, including adjacency, Laplacian, as well as the adjacency energy of the line graph.

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