A tight upper bound of spectral radius in terms of degree deviation
Abstract
Let G be a graph with n vertices and m edges. The spectral radius (G) of G is the largest eigenvalue of the adjacency matrix of G. As is well known, (G)≥2mn with equality if and only if G is regular. To bound (G)-2mn, Nikiforov (2006) introduced the degree deviation of G as s(G)=Σ1≤ i≤ n|di-2mn|, where d1,d2,…,dn are the degrees of the vertices of G. Nikiforov conjectured that (G)-2mn≤12s(G) for sufficiently large m and n. In this paper, we settle this conjecture without the assumption that m and n are large.
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