Degree Deviation and Spectral Radius
Abstract
For a finite, simple, and undirected graph G with n vertices, m edges, and largest eigenvalue λ, Nikiforov introduced the degree deviation of G as s=Σu∈ V(G)|dG(u)-2mn|. Contributing to a conjecture of Nikiforov, we show λ-2mn≤ 2s3. For our result, we show that the largest eigenvalue of a graph that arises from a bipartite graph with mA,B edges by adding mA edges within one of the two partite sets is at most mA+mA,B+mA2+2mAmA,B, which is a common generalization of results due to Stanley and Bhattacharya, Friedland, and Peled.
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