A Linear Lower Bound for the Square Energy of Graphs

Abstract

Let G be a graph of order n with eigenvalues λ1 ≥ ·s ≥λn. Let \[s+(G)=Σλi>0 λi2, s-(G)=Σλi<0 λi2.\] The smaller value, s(G)=\s+(G), s-(G)\ is called the square energy of G. In 2016, Elphick, Farber, Goldberg and Wocjan conjectured that for every connected graph G of order n, s(G)≥ n-1. No linear bound for s(G) in terms of n is known. Let H1, …, Hk be disjoint vertex-induced subgraphs of G. In this note, we prove that \[s+(G)≥Σi=1k s+(Hi) and s-(G)≥Σi=1k s-(Hi),\] which implies that s(G)≥ 3n4 for every connected graph G of order n 4.