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- ...er of [[general topology]]. From the formal point of view, the notion of a uniform space is a sibling of the notion of a topological space. While uniform spaces are === Uniform space (definition) ===45 KB (7,747 words) - 06:00, 17 October 2013
- 12 bytes (1 word) - 07:06, 18 December 2007
- 189 bytes (23 words) - 20:36, 4 September 2009
- Auto-populated based on [[Special:WhatLinksHere/Uniform space]]. Needs checking by a human.505 bytes (65 words) - 21:20, 11 January 2010
Page text matches
- #REDIRECT [[Uniform space#Uniform base]]40 bytes (5 words) - 02:40, 2 December 2008
- {{r|Uniform space}}359 bytes (48 words) - 15:04, 28 July 2009
- #REDIRECT [[Uniform space]]27 bytes (3 words) - 06:09, 18 December 2007
- #REDIRECT [[Uniform space]]27 bytes (3 words) - 02:38, 2 December 2008
- #REDIRECT [[Uniform space#Two extreme examples]]48 bytes (6 words) - 07:51, 28 December 2008
- * A discrete space is a uniform space with the [[discrete uniformity]].872 bytes (125 words) - 15:57, 4 January 2013
- {{r|Uniform space}}942 bytes (125 words) - 18:29, 11 January 2010
- Auto-populated based on [[Special:WhatLinksHere/Uniform space]]. Needs checking by a human.505 bytes (65 words) - 21:20, 11 January 2010
- {{r|Uniform space}}541 bytes (68 words) - 20:17, 11 January 2010
- * A [[uniform base]] is a family of relations on a set that generates a [[uniform space]] structure.885 bytes (138 words) - 19:39, 31 January 2009
- {{r|Uniform space}}959 bytes (152 words) - 15:06, 28 July 2009
- ...er of [[general topology]]. From the formal point of view, the notion of a uniform space is a sibling of the notion of a topological space. While uniform spaces are === Uniform space (definition) ===45 KB (7,747 words) - 06:00, 17 October 2013
- ====[[Metric space|Metric]] and [[Uniform space|uniform]] spaces==== ...iform space. More generally, every commutative topological group is also a uniform space. A non-commutative topological group, however, carries two uniform structur28 KB (4,311 words) - 08:36, 14 October 2010
- ...completeness (topology)|complete]] (in the sense of [[metric space]]s or [[uniform space]]s, which is a different sense than the Dedekind completeness of the order ...atics)|group]] (in this case, the additive group of the field) defines a [[uniform space|uniform]] structure, and uniform structures have a notion of [[completeness19 KB (2,948 words) - 10:07, 28 February 2024