On eigenvalues of Seidel matrices and Haemers' conjecture

Abstract

For a graph G, let S(G) be the Seidel matrix of G and 1(G),...,n(G) be the eigenvalues of S(G). The Seidel energy of G is defined as |1(G)|+...+|n(G)|. Willem Haemers conjectured that the Seidel energy of any graph with n vertices is at least 2n-2, the Seidel energy of the complete graph with n vertices. Motivated by this conjecture, we prove that for any with 0<<2, |1(G)|+...+|n(G)| (n-1)+n-1 if and only if | det S(G)| n-1. This, in particular, implies the Haemers' conjecture for all graphs G with | det S(G)| n-1.