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Variable neighborhood search for extremal graphs. 16. Some conjectures related to the largest eigenvalue of a graph

✍ Scribed by M. Aouchiche; F.K. Bell; D. Cvetković; P. Hansen; P. Rowlinson; S.K. Simić; D. Stevanović

Book ID
108118321
Publisher
Elsevier Science
Year
2008
Tongue
English
Weight
458 KB
Volume
191
Category
Article
ISSN
0377-2217

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✦ Synopsis

We consider four conjectures related to the largest eigenvalue of (the adjacency matrix of) a graph (i.e., to the index of the graph). Three of them have been formulated after some experiments with the programming system AutoGraphiX, designed for finding extremal graphs with respect to given properties by the use of variable neighborhood search. The conjectures are related to the maximal value of the irregularity and spectral spread in n-vertex graphs, to a Nordhaus-Gaddum type upper bound for the index, and to the maximal value of the index for graphs with given numbers of vertices and edges. None of the conjectures has been resolved so far. We present partial results and provide some indications that the conjectures are very hard.

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