Abstract.
The bandwidth of a graph is the minimum, over vertex labelings with distinct integers, of the maximum difference between labels on adjacent vertices. Kuang and McDiarmid proved that almost all n-vertex graphs have bandwidth . Thus the sum of the bandwidths of a graph and its complement is almost always at least ; we prove that it is always at most 2n−4 log 2 n+o(log n). The proofs involve improving the bounds on the Ramsey and Turán numbers of the “halfgraph”.
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Received: September 2, 1998¶Final version received: November 29, 1999
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Füredi, Z., West, D. Ramsey Theory and Bandwidth of Graphs. Graphs Comb 17, 463–471 (2001). https://doi.org/10.1007/PL00013410
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DOI: https://doi.org/10.1007/PL00013410