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- 12 bytes (1 word) - 13:50, 7 February 2009
- ...to procedures that correct inconsistencies in the [[topology (mathematics)|topology]] of a surface [[mesh]] that has been obtained from noisy imaging data.228 bytes (29 words) - 05:45, 8 September 2009
- The '''topology''' of a [[computer network]] defines how that network is "laid out." Topolo ==Star topology==6 KB (923 words) - 12:40, 11 June 2009
- #REDIRECT [[Neighbourhood (topology)]]38 bytes (3 words) - 04:58, 27 May 2009
- #REDIRECT [[Talk:Neighbourhood (topology)/Draft]]49 bytes (5 words) - 20:15, 6 May 2010
- 12 bytes (1 word) - 04:47, 26 December 2007
- In [[general topology]], an '''end''' of a [[topological space]] generalises the notion of "point1 KB (250 words) - 01:07, 19 February 2009
- == Emphasis on topology vs. on failure/recovery modes == ...tocol]] (neither 6 nor 4). In turn, that brought me, which is an aspect of topology at a different level than here, about how nonbroadcast multiaccess (usually2 KB (349 words) - 20:28, 3 September 2008
- ...ed as the set of all points in ''A'' for which ''A'' is a [[neighbourhood (topology)|neighbourhood]]. * The complement of the [[closure (topology)|closure]] of a set in ''X'' is the interior of the complement of that set;1 KB (172 words) - 15:44, 7 February 2009
- In [[general topology]], the '''product topology''' is an assignment of open sets to the [[Cartesian product]] of a family o ...(that is, ''H'' is an element of ''U''). So a set is open in the product topology if is a union of products of open sets.2 KB (345 words) - 16:47, 6 February 2010
- 12 bytes (1 word) - 15:43, 7 February 2009
- 12 bytes (1 word) - 05:46, 8 September 2009
- * The complement of the closure of a set in ''X'' is the [[interior (topology)|interior]] of the complement of that set; the complement of the interior o1 KB (184 words) - 15:20, 6 January 2009
- ...quence]]. Convergence of a net may be used to completely characterise the topology. ...cite book | author=J.L. Kelley | authorlink=John L. Kelley | title=General topology | publisher=van Nostrand | year= 1955 | pages=62-83 }}1,002 bytes (167 words) - 17:12, 7 February 2009
- 27 bytes (3 words) - 10:57, 25 May 2010
- ...opology]], the '''subspace topology''', or '''induced''' or '''relative''' topology, is the assignment of open sets to a [[subset]] of a [[topological space]]. ...family of [[open set]]s, and let ''A'' be a subset of ''X''. The subspace topology on ''A'' is the family814 bytes (118 words) - 13:51, 7 February 2009
- In [[topology]], '''separability''' may refer to:109 bytes (13 words) - 12:54, 31 May 2009
- I propose to move this article to ''Closure (topology)'': there are several other used of the word "closure" in mathematics, such356 bytes (54 words) - 15:20, 6 January 2009
- In [[mathematics]], the '''cofinite topology''' is the [[topology]] on a [[set (mathematics)|set]] in the the [[open set]]s are those which h .... We therefore assume that ''X'' is an [[infinite set]] with the cofinite topology; it is:1,007 bytes (137 words) - 22:52, 17 February 2009
- 12 bytes (1 word) - 01:08, 19 February 2009
Page text matches
- '''Countability axioms in topology''' are properties that a [[topological space]] may satisfy which refer to t ...''' is one for which there is a countable [[base (topology)|base]] for the topology.677 bytes (96 words) - 01:19, 18 February 2009
- #REDIRECT [[Topology]]22 bytes (2 words) - 07:50, 22 January 2010
- ...d. Its construction bears the same relation to the [[Étale morphism|étale topology]] as the [[Weil group]] does to the [[Galois group]]. * Lichtenbaum, Stephen. (date) ''The Weil-Étale Topology'', (preprint?).809 bytes (109 words) - 12:00, 1 January 2008
- {{r|Topology}} {{r|Interior (topology)}}288 bytes (41 words) - 15:20, 6 January 2009
- In [[topology]], a '''Noetherian space''' is a [[topological space]] satisfying the [[des ...et in a Noetherian space is again Noetherian with respect to the [[induced topology]].574 bytes (88 words) - 17:18, 7 February 2009
- {{r|Topology (mathematics)}} {{r|Hole (topology)}}1 KB (181 words) - 06:14, 5 February 2010
- ...cite book | author=J.L. Kelley | authorlink=John L. Kelley | title=General topology | publisher=van Nostrand | year= 1955 }} ...Arthur Steen | coauthors=J. Arthur Seebach jr | title=[[Counterexamples in Topology]] | year=1978 | publisher=[[Springer-Verlag]] | location=Berlin, New York }361 bytes (44 words) - 16:09, 2 November 2008
- #REDIRECT [[Network topology]]30 bytes (3 words) - 02:42, 1 April 2007
- #REDIRECT [[Closure (topology)]]32 bytes (3 words) - 08:34, 2 March 2024
- #REDIRECT [[Network topology]]30 bytes (3 words) - 00:16, 8 September 2008
- #REDIRECT [[Genus (topology)]]30 bytes (3 words) - 18:54, 27 February 2010
- #REDIRECT [[Closure (topology)]]32 bytes (3 words) - 15:20, 6 January 2009
- #REDIRECT [[Neighbourhood (topology)]]38 bytes (3 words) - 04:58, 27 May 2009
- #REDIRECT [[Grothendieck topology]]35 bytes (3 words) - 12:52, 4 December 2007
- #REDIRECT [[Topology correction]]33 bytes (3 words) - 02:48, 9 September 2009
- ...cite book | author=J.L. Kelley | authorlink=John L. Kelley | title=General topology | publisher=van Nostrand | year= 1955 }} ...rthur Steen | coauthors= J. Arthur Seebach jr | title=[[Counterexamples in Topology]] | year=1978 | publisher=[[Springer-Verlag]] | location=Berlin, New York |383 bytes (48 words) - 02:19, 28 November 2008
- * [http://www.dmoz.org/Science/Math/Topology/ Open Directory - Topology]85 bytes (12 words) - 14:25, 29 December 2008
- {{r|Interior (topology)}}39 bytes (4 words) - 11:08, 31 May 2009
- #REDIRECT [[Talk:Closure (topology)]]37 bytes (4 words) - 15:20, 6 January 2009
- In [[general topology]], the '''product topology''' is an assignment of open sets to the [[Cartesian product]] of a family o ...(that is, ''H'' is an element of ''U''). So a set is open in the product topology if is a union of products of open sets.2 KB (345 words) - 16:47, 6 February 2010