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- In [[algebra]], the '''Frobenius map''' is the ''p''-th power map considered as acting on [[commutativity|commut ...eed not be [[surjective function|surjective]], however. An example is the Frobenius map applied to the [[rational function]] field <math>\mathbf{F}_p(X)</math>, wh1 KB (166 words) - 18:17, 16 February 2009
- 12 bytes (1 word) - 18:18, 16 February 2009
- | pagename = Frobenius map | abc = Frobenius map2 KB (227 words) - 18:17, 16 February 2009
- 137 bytes (19 words) - 07:54, 4 September 2009
- Auto-populated based on [[Special:WhatLinksHere/Frobenius map]]. Needs checking by a human.483 bytes (61 words) - 16:42, 11 January 2010
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- #REDIRECT [[Frobenius map#Frobenius automorphism]]50 bytes (5 words) - 15:38, 7 December 2008
- In [[algebra]], the '''Frobenius map''' is the ''p''-th power map considered as acting on [[commutativity|commut ...eed not be [[surjective function|surjective]], however. An example is the Frobenius map applied to the [[rational function]] field <math>\mathbf{F}_p(X)</math>, wh1 KB (166 words) - 18:17, 16 February 2009
- ==The Frobenius map ==2 KB (406 words) - 20:45, 8 February 2010
- | pagename = Frobenius map | abc = Frobenius map2 KB (227 words) - 18:17, 16 February 2009
- ...''k'' mod ''n'', where φ is the [[Frobenius_map#Frobenius_for_local_fields|Frobenius map]] and π is a uniformiser.<ref name=F226>Falko (2008) p.226</ref> The ''in1 KB (216 words) - 13:04, 3 January 2013
- Auto-populated based on [[Special:WhatLinksHere/Frobenius map]]. Needs checking by a human.483 bytes (61 words) - 16:42, 11 January 2010
- {{r|Frobenius map}}522 bytes (67 words) - 20:03, 11 January 2010
- {{r|Frobenius map}}692 bytes (91 words) - 16:33, 11 January 2010
- {{r|Frobenius map}}710 bytes (90 words) - 19:54, 11 January 2010
- {{r|Frobenius map}}858 bytes (112 words) - 15:35, 11 January 2010
- ...eed not be [[surjective function|surjective]], however. An example is the Frobenius map <math>\Phi: x \mapsto x^p</math> applied to the [[rational function]] field3 KB (418 words) - 12:18, 20 December 2008
- Suppose that ''F'' is finite of characteristic ''p''. The [[Frobenius map]] is an [[field automorphism|automorphism]] of ''F'' and so its [[inverse f2 KB (295 words) - 15:43, 7 December 2008
- {{r|Frobenius map}}2 KB (247 words) - 06:00, 7 November 2010
- Suppose that ''F'' is finite, of characteristic two. The Frobenius map is an automorphism and so its [[inverse function|inverse]], the square root10 KB (1,580 words) - 08:52, 4 March 2009
- {{rpl|Frobenius map}}5 KB (628 words) - 04:35, 22 November 2023