More eigenvalue problems of Nordhaus-Gaddum type
Abstract
Let G be a graph of order n and let μ1(G) ≥ ·s≥μn(G) be the eigenvalues of its adjacency matrix. This note studies eigenvalue problems of Nordhaus-Gaddum type. Let G be the complement of a graph G. It is shown that if s≥2 and n≥15(s-1) , then \[ μs(G) +|μs(G)|\,≤ n/2(s-1)-1. \] Also if s≥1 and n≥4s, then \[ μn-s+1(G) +|μn-s+1( G)|\,≤ n/2s+1. \] If s=2k+1 for some integer k, these bounds are asymptotically tight. These results settle infinitely many cases of a general open problem.
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