Some Bounds on the Energy of Graphs with Self-Loops regarding λ1 and λn

Abstract

Let GS be a graph with n vertices obtained from a simple graph G by attaching one self-loop at each vertex in S ⊂eq V(G). The energy of GS is defined by Gutman et al. as E(GS)=Σi=1n| λi -σn |, where λ1,…,λn are the adjacency eigenvalues of GS and σ is the number of self-loops of GS. In this paper, several upper and lower bounds of E(GS) regarding λ1 and λn are obtained. Especially, the upper bound E(GS) ≤ n(2m+σ-σ2n) () given by Gutman et al. is improved to the following bound align* E(GS)≤ n(2m+σ-σ2n)-n2( |λ1-σn |- |λn-σn |)2, align* where | λ1-σn| ≥ … ≥ | λn-σn|. Moreover, all graphs are characterized when the equality holds in Gutmans' bound () by using this new bound.