File:GrapheCayley-C3xC3semiC2-Tore.svg
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(Du source XML) Il y a trois groupes non-abéliens d'ordre 18: S_3 X C_3, le groupe dihédrale D_18, et finalement ce groupe-ci, un produit semi-direct de C_3^2 par C_2, qui agit par inversion. Il a une présentation < x,y,z | x^2 = y^2 = z^2 = (xy)^3 = (xz)^3 = (yz)^3 = (xyz)^2 > On peut dessiner le graphe de Cayley de ces trois générateurs sur une surface de genre 1, qui sera divisée en 9 régions, et coloriée avec 3 couleurs. |
| Date | 31 August 2007 (original upload date) |
| Source | No machine-readable source provided. Own work assumed (based on copyright claims). |
| Author | No machine-readable author provided. Fool~commonswiki assumed (based on copyright claims). |
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I, the copyright holder of this work, release this work into the public domain. This applies worldwide. In some countries this may not be legally possible; if so: I grant anyone the right to use this work for any purpose, without any conditions, unless such conditions are required by law. |
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| Date/Time | Thumbnail | Dimensions | User | Comment | |
|---|---|---|---|---|---|
| current | 02:43, 31 August 2007 | | 600 × 600 (9 KB) | Fool~commonswiki (talk | contribs) | (''Du source XML'') Il y a trois groupes non-abéliens d'ordre 18: S_3 X C_3, le groupe dihédrale D_18, et finalement ce groupe-ci, un [[:fr:produit semi-direct|pr |
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