Bounds for the Energy of Graphs

Let G be a graph on n vertices and m edges, with maximum degree Δ ( G ) and minimum degree δ ( G ) . Let A be the adjacency matrix of G , and let λ 1 ≥ λ 2 ≥ … ≥ λ n be the eigenvalues of G . The energy of G , denoted by E ( G ) , is defined as the sum of the absolute values of the eigenvalues of G , that is E ( G ) = | λ 1 | + … + | λ n | . The energy of G is known to be at least twice the minimum degree of G , E ( G ) ≥ 2 δ ( G ) . Akbari and Hosseinzadeh conjectured that the energy of a graph G whose adjacency matrix is nonsingular is in fact greater than or equal to the sum of the maximum and the minimum degrees of G , i.e., E ( G ) ≥ Δ ( G ) + δ ( G ) . In this paper, we present a proof of this conjecture for hyperenergetic graphs, and we prove an inequality that appears to support the conjectured inequality. Additionally, we derive various lower and upper bounds for E ( G ) . The results rely on elementary inequalities and their application.