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Let G be a simple graph on n vertices with vertex set V (G). The energy of G, denoted by, E (G) is the sum of all absolute values of the eigenvalues of the adjacency matrix A (G). It is the first eigenvalue-based topological molecular index and is related to the molecular orbital energy levels of -electrons in conjugated hydrocarbons. Recently, the concept of energy of a graph is extended to a self-loop graph. Let S be a subset of V (G). The graph GS is obtained from the graph G by attaching a self-loop at each of the vertices of G which are in the set S. The energy of the self-loop graph GS, denoted by E (GS), is the sum of all absolute eigenvalues of the matrix A (GS). Two non-isomorphic self-loop graphs are equienergetic if their energies are equal. Akbari et al. (2023) conjectured that there exist a subset S of V (G) such that (GS) > E (G). In this paper, we confirm this conjecture. Also, we construct pairs of equienergetic self-loop graphs of order 24n for all n 1.
Rakshith et al. (Thu,) studied this question.