Maximum spectral sum of graphs
Abstract
For a graph G of order n, the spectral sum of G is defined to be the sum λ1(G) + λ2(G), where λ1(G) (resp. λ2(G)) is the largest (resp. second largest) adjacency eigenvalue of G. Ebrahimi, Mohar, Nikiforov and Ahmady (2008) conjectured that the spectral sum \[ λ1(G) + λ2(G) 87n \] for any graph G. We prove this conjecture by combining tools from the theory of graph limits, convex geometry, exterior algebra and convex optimization. The techniques developed are of independent interest.
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