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Recherche à voisinage variable de graphes extrémaux 13. à propos dela maille*

Published online by Cambridge University Press:  08 April 2006

Mustapha Aouchiche  and
Pierre Hansen
Mustapha Aouchiche
Affiliation:
Département de mathématiques et génie industriel, École Polytechnique de Montréal, Qc, Canada; Mustapha.Aouchiche@gerad.ca
Pierre Hansen
Affiliation:
GERAD et Service de l'enseignement des méthodes quantitatives de gestion HEC Montréal, Qc, Canada; Pierre.Hansen@gerad.ca
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Abstract

Le système AutoGraphiX (AGX1 et AGX2) permet, parmi d'autres fonctions, la génération automatique de conjectures en théorie des graphes et, dans une version plus récente, la preuve automatique de conjectures simples. Afin d'illustrer ces fonctions et le type de résultats obtenus, nous étudions systématiquement ici des conjectures obtenues par ce système et de la forme $\underline{b}_{n} \, \le \, g \, \oplus \, i \, \le \, \overline{b}_{n}$g désigne la maille (ou longueur du plus petit cycle) du graphe G=(V, E), i un autre invariant choisi parmi le nombre de stabilité, le rayon, le diamètre, le degré minimum, moyen ou maximum, $\underline{b}_{n} $ et $ \overline{b}_{n} $ des fonctions de l'ordre n = |V| de G les meilleures possibles, enfin $ \oplus $ correspond à une des opérations +,-,×,/. 48 telles conjectures sont obtenues: les plus simples sont démontrées automatiquement et les autres à la main. De plus 12 autres conjectures ouvertes et non encore étudiées sont soumises aux lecteurs.

Keywords

GrapheinvariantconjectureAGXmaille.
Type
Research Article
Information
RAIRO - Operations Research , Volume 39 , Issue 4 , October 2005 , pp. 275 - 293
Copyright
© EDP Sciences, 2006

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References

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* Cet article est le treizième de la série “Variable Neighborhood Search for Extremal Graphs” publiée à partir de 1998 (voir bibliographie). La recherche présentée a bénéficié du support de la Chaire HEC en Exploitation de Données et de la subvention CRSNG No. 105574-1998.