Extremal values for the square energies of graphs

Abstract

Let G be a graph with n non-isolated vertices and m edges. The positive / negative square energies of G, denoted s+(G) / s-(G), are defined as the sum of squares of the positive / negative eigenvalues of the adjacency matrix AG of G. In this work, we provide several new tools for studying square energy encompassing semi-definite optimization, graph operations, and surplus. Using our tools, we prove the following results on the extremal values of s(G) with a given number of vertices and edges. 1. We have (s+(G), s-(G)) ≥ n - γ ≥ n2, where γ is the domination number of G. This verifies a conjecture of Elphick, Farber, Goldberg and Wocjan up to a constant, and proves a weaker version of this conjecture introduced by Elphick and Linz. 2. We have s+(G) ≥ m6/7 - o(1) and s-(G) = (m1/2), with both exponents being optimal.