Resolvent Energy of Unicyclic, Bicyclic and Tricyclic Graphs
Abstract
The resolvent energy of a graph G of order n is defined as ER=Σi=1n (n-λi)-1, where λ1,λ2,…,λn are the eigenvalues of G. In a recent work [Gutman et al., MATCH Commun. Math. Comput. Chem.\/ 75 (2016) 279--290] the structure of the graphs extremal w.r.t. ER were conjectured, based on an extensive computer--aided search. We now confirm the validity of some of these conjectures.
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