Some Results On Spectrum And Energy Of Graphs With Loops

Abstract

Let GS be a graph with loops obtained from a graph G of order n and loops at S ⊂eq V(G). In this paper, we establish a neccesary and sufficient condition on the bipartititeness of a connected graph G and the spectrum Spec(GS) and Spec(GV(G) S). We also prove that for every S ⊂eq V(G), E(GS) ≥ E(G) when G is bipartite. Moreover, we provide an identification of the spectrum of complete graphs Kn and complete bipartite graphs Km,n with loops. We characterize any graphs with loops of order n whose eigenvalues are all positive or non-negative, and also any graphs with a few distinct eigenvalues. Finally, we provide some bounds related to GS.