New Eigenvalue Bound for the Fractional Chromatic Number

Abstract

Given a graph G, we let s+(G) denote the sum of the squares of the positive eigenvalues of the adjacency matrix of G, and we similarly define s-(G). We prove that \[f(G) 1+\s+(G)s-(G),s-(G)s+(G)\\] and thus strengthen a result of Ando and Lin, who showed the same lower bound for the chromatic number (G). We in fact show a stronger result wherein we give a bound using the eigenvalues of G and H whenever G has a homomorphism to an edge-transitive graph H. Our proof utilizes ideas motivated by association schemes.

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