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- A ring <math>A</math> is said to be a '''local ring''' if it has a unique maximal ideal <math>m</math>. It is said to be ''semi ...ivity|commutative]] [[integral domain]] at a non-zero [[prime ideal]] is a local ring.844 bytes (130 words) - 12:09, 2 January 2009
- 190 bytes (22 words) - 12:05, 2 January 2009
- Let <math>A</math> be a [[Noetherian ring|Noetherian]] [[local ring]] with maximal ideal <math>m</math> and residual field <math>k=A/m</math>. And when these conditions hold, <math>A</math> is called a regular local ring.1 KB (191 words) - 00:03, 21 February 2010
- #REDIRECT [[Regular local ring]]32 bytes (4 words) - 12:52, 4 December 2007
- 12 bytes (1 word) - 18:46, 23 December 2007
- #REDIRECT [[Local ring#Complete local ring]]44 bytes (6 words) - 12:06, 21 December 2008
- #REDIRECT [[Local ring]]24 bytes (3 words) - 12:08, 21 December 2008
- 71 bytes (10 words) - 12:03, 2 January 2009
- Noetherian local ring having the property that the minimal number of generators of its maximal id181 bytes (27 words) - 11:22, 4 September 2009
- 12 bytes (1 word) - 18:18, 23 December 2007
- 878 bytes (140 words) - 12:04, 2 January 2009
- Auto-populated based on [[Special:WhatLinksHere/Regular local ring]]. Needs checking by a human.458 bytes (60 words) - 19:58, 11 January 2010
Page text matches
- A ring <math>A</math> is said to be a '''local ring''' if it has a unique maximal ideal <math>m</math>. It is said to be ''semi ...ivity|commutative]] [[integral domain]] at a non-zero [[prime ideal]] is a local ring.844 bytes (130 words) - 12:09, 2 January 2009
- #REDIRECT [[Local ring#Complete local ring]]44 bytes (6 words) - 12:06, 21 December 2008
- ...therian ring, such that the localization at every prime ideal is a regular local ring.138 bytes (19 words) - 11:23, 4 September 2009
- Let <math>A</math> be a [[Noetherian ring|Noetherian]] [[local ring]] with maximal ideal <math>m</math> and residual field <math>k=A/m</math>. And when these conditions hold, <math>A</math> is called a regular local ring.1 KB (191 words) - 00:03, 21 February 2010
- ...[localisation]] at every [[prime ideal]] is a [[Regular Local Ring|regular local ring]]: that is, every such localization has the property that the minimal numbe970 bytes (142 words) - 00:04, 21 February 2010
- #REDIRECT [[Local ring]]24 bytes (3 words) - 12:08, 21 December 2008
- #REDIRECT [[Regular local ring]]32 bytes (4 words) - 12:52, 4 December 2007
- {{r|Local ring}}675 bytes (89 words) - 17:28, 11 January 2010
- * [[Complete local ring]]120 bytes (13 words) - 12:25, 4 January 2009
- A description of a canonical form for formal power series over a complete local ring.121 bytes (18 words) - 15:11, 21 December 2008
- Noetherian local ring having the property that the minimal number of generators of its maximal id181 bytes (27 words) - 11:22, 4 September 2009
- {{r|Local ring}}858 bytes (112 words) - 15:35, 11 January 2010
- {{r|Local ring}}1 KB (187 words) - 20:18, 11 January 2010
- ...' describes a canonical form for [[formal power series]] over a [[complete local ring]]. Let ''O'' be a complete local ring and ''f'' a formal power series in ''O''[[''X'']]. Then ''f'' can be writt745 bytes (116 words) - 13:35, 8 March 2009
- Auto-populated based on [[Special:WhatLinksHere/Regular local ring]]. Needs checking by a human.458 bytes (60 words) - 19:58, 11 January 2010
- {{r|Regular local ring}}458 bytes (60 words) - 19:58, 11 January 2010
- ...sation at ''S'', also denoted by <math>R_{\mathfrak{p}}</math>. It is a [[local ring]] with a unique [[maximal ideal]] — the ideal generated by <math>\mat2 KB (312 words) - 09:18, 21 October 2009
- {{r|Local ring}}862 bytes (139 words) - 12:15, 2 January 2009
- {{r|Regular local ring}}871 bytes (140 words) - 16:46, 30 October 2008
- # The [[ringed space|stalk]] <math>O_{X,x}</math> is isomorphic to the local ring <math>A_{\mathfrak{p}}</math>, where <math>\mathfrak{p}</math> is the prime3 KB (525 words) - 17:31, 10 December 2008