Nair Maria Maia de Abreu, Vladimir Nikiforov
Published 2013-08-07, updated 2013-09-19Version 2
This paper gives a tight upper bound on the spectral radius of the signless Laplacian of graphs of given order and clique number. More precisely, let G be a graph of order n, let A be its adjacency matrix, and let D be the diagonal matrix of the row-sums of A. If G has clique number r, then the largest eigenvalue q(G) of the matrix Q=A+D satisfies q(G)<= 2(1-1/r)n. If G is a complete regular r-partite graph, then equality holds in the above inequality. This result confirms a conjecture of Hansen and Lucas.
Comments: 10 pages, corrected a typo
Journal: Electronic J. Linear Algebra 23 (2012), 782-789
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