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- A '''Dedekind domain''' is a [[Noetherian domain]] <math>o</math>, integrally closed in its [[fi ...al. However, these notions are equivalent for Dedekind domains; that is, a Dedekind domain <math>A</math> is a principal ideal domain if and only if it is a unique fa2 KB (306 words) - 15:51, 10 December 2008
- 240 bytes (22 words) - 07:44, 21 September 2008
- 12 bytes (1 word) - 03:47, 24 December 2007
- 140 bytes (20 words) - 07:43, 21 September 2008
- 356 bytes (46 words) - 13:02, 29 November 2008
Page text matches
- A '''Dedekind domain''' is a [[Noetherian domain]] <math>o</math>, integrally closed in its [[fi ...al. However, these notions are equivalent for Dedekind domains; that is, a Dedekind domain <math>A</math> is a principal ideal domain if and only if it is a unique fa2 KB (306 words) - 15:51, 10 December 2008
- {{r|Dedekind domain}}843 bytes (113 words) - 10:49, 11 January 2010
- {{r|Dedekind domain}}675 bytes (89 words) - 17:28, 11 January 2010
- {{r|Dedekind domain}}668 bytes (88 words) - 12:30, 29 November 2008
- {{r|Dedekind domain}}497 bytes (63 words) - 17:28, 11 January 2010
- {{r|Dedekind domain}}574 bytes (75 words) - 21:21, 11 January 2010
- Examples of regular rings include fields (of dimension zero) and [[Dedekind domain]]s. If ''A'' is regular then so is ''A''[''X''], with dimension one greate970 bytes (142 words) - 00:04, 21 February 2010
- {{r|Dedekind domain}}1 KB (146 words) - 16:32, 11 January 2010
- The ring of integers is a [[Dedekind domain]], having unique factorisation of ideals into prime ideals.7 KB (1,077 words) - 17:18, 10 January 2009
- ...nique factorization into [[prime ideal]]s. For more on this, read about [[Dedekind domain]]s.9 KB (1,496 words) - 06:25, 23 April 2008
- * [[User:Giovanni Antonio DiMatteo|Giovanni]] surveyed his [[Dedekind domain|domain]].27 KB (4,310 words) - 05:02, 8 March 2024