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267 B (43 words) - 21:51, 19 April 2016
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267 B (42 words) - 07:31, 21 July 2016
- *** [[Notes:Topology - Munkres/Section 68|Section 68]]176 B (23 words) - 10:18, 9 August 2016
- * Part overview: ''[[Notes:Topology - Munkres/Part 2|Part II - Algebraic Topology]] * Chapter overview: ''[[Notes:Topology - Munkres/Chapter 11|Chapter 11 - The Seifert-van Kampen Theorem]]1,008 B (160 words) - 11:57, 9 August 2016
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267 B (43 words) - 09:49, 11 November 2016
Page text matches
- ...is no separation of <math>X</math><ref name="Topology">Topology - James R. Munkres - 2nd edition</ref> A separation of {{M|X}} is:5 KB (866 words) - 01:52, 1 October 2016
- ...ace|topological space]] is compact<ref name="Topology">Topology - James R. Munkres - Second Edition</ref> if every [[Covering|open cover]] of <math>X</math> c5 KB (828 words) - 15:59, 1 December 2015
- ...ace topology'' as follows:<ref name="Topology">Topology - Second Edition - Munkres</ref>6 KB (1,146 words) - 23:04, 25 September 2016
- {{M|p}} is a quotient map<ref>Topology - Second Edition - James R Munkres</ref> if we have <math>U\in\mathcal{K}\iff p^{-1}(U)\in\mathcal{J}</math>5 KB (795 words) - 13:34, 16 October 2016
- ...hcal{P}(X)}} such that<ref name="Top">Topology - Second Edition - James R. Munkres</ref>: {{Todo|Do this, see page 81 in Munkres - shouldn't be hard!}}5 KB (802 words) - 18:35, 17 December 2016
- {{Requires references|grade=A|msg=Check Munkres and Topological Manifolds}}5 KB (871 words) - 20:32, 23 September 2016
- ...s ''[[Well-ordered set|well-ordered]]''<ref name="Top">Topology - James R. Munkres - 2nd edition</ref>)488 B (76 words) - 17:34, 24 July 2015
- Topology by Munkres has a great bit on compactness! It uses open sets in topology.336 B (58 words) - 03:59, 22 June 2015
- {{Todo|Munkres - p165}}23 B (4 words) - 04:52, 22 June 2015
- ...{M|a<b}} is said to be ''well ordered''<ref name="top">Topology - James R. Munkres - Second Edition</ref> if:916 B (164 words) - 17:49, 24 July 2015
- ...logy' is another name for the [[Trivial topology]]<ref>Topology - James R. Munkres</ref>193 B (24 words) - 16:27, 14 August 2015
- ...es known as the ''indiscrete topology''<ref name="Top">Topology - James R. Munkres - Second Edition</ref>)is an example of a [[Topological space|topological s1 KB (235 words) - 16:41, 14 August 2015
- ...ists of 3 things<ref name="EOAT">Elements of Algebraic Topology - James R. Munkres</ref>: # A [[Class|class]] of ''objects'' {{M|\mathcal{X} }}<ref group="Note">Munkres calls the class of objects {{M|X}} and uses {{M|X}} for specific objects. N2 KB (347 words) - 00:36, 27 September 2015
- ...this [[limit]] exists<ref name="Munkres">Analysis on Manifolds - James R. Munkres</ref>. This is the same as:1 KB (231 words) - 18:47, 19 November 2015
- {{Todo|I believe that Munkres uses this definition, but I will check before listing that as a reference}} * James R. Munkres3 KB (449 words) - 20:23, 28 October 2016
- ...containing an open set with the point in it. However some authors (notably Munkres) ''do not'' use this definition and use neighbourhood as a synonym for [[op3 KB (492 words) - 09:48, 30 December 2016
- ...e=A|msg=Mendelson and Lee's topological manifolds have it covered, I think Munkres is where I got "separation" from}}752 B (124 words) - 22:15, 30 September 2016
- ==Munkres== '''Munkres starts with a quotient map'''6 KB (1,087 words) - 19:45, 26 April 2016
- ===Munkres===2 KB (295 words) - 15:44, 25 April 2016
- {{Requires references|grade=A|msg=Munkres or Lee's topological manifolds. I'll fill it in when I'm more used to the t737 B (113 words) - 21:06, 23 September 2016
