File:GrapheCayley-C3xC3semiC2-Tore.svg
Original file (SVG file, nominally 600 × 600 pixels, file size: 9 KB)
Captions
Summary edit
DescriptionGrapheCayley-C3xC3semiC2-Tore.svg |
(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). |
Licensing edit
Public domainPublic domainfalsefalse |
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. |
File history
Click on a date/time to view the file as it appeared at that time.
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 |
You cannot overwrite this file.
File usage on Commons
There are no pages that use this file.
File usage on other wikis
The following other wikis use this file:
- Usage on fr.wikipedia.org
Metadata
This file contains additional information such as Exif metadata which may have been added by the digital camera, scanner, or software program used to create or digitize it. If the file has been modified from its original state, some details such as the timestamp may not fully reflect those of the original file. The timestamp is only as accurate as the clock in the camera, and it may be completely wrong.
Short title | Graphe de Cayley de <R,V,B| RR=VV=BB=RVRVRV=RBRBRB=VBVBVB=RVBRVB=1> dessiné sur un tore |
---|---|
Image title |
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 semidirect 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. |