Symmetry and asymmetry between positive and negative square energies of graphs

Abstract

The positive and negative square energies of a graph, s+(G) and s-(G), are the sums of squares of the positive and negative eigenvalues of the adjacency matrix, respectively. The first results on square energies revealed symmetry between s+(G) and s-(G). This paper reviews examples of asymmetry between these parameters, for example using large random graphs and the ratios s+/s- and s-/s+, as well as new examples of symmetry. We answer some questions previously asked about s+ and s- and suggest several further avenues of research.

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