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⚫ | I've just started trying to learn some topology, and I've come across this definition a few times. While I think I can visualise the specific example - two points, disjoint open sets around them - I don't feel I fully understand it. Can anyone help me (and presumably anyone else new to topology)? | ||
{{WikiProject Mathematics|small= |importance=mid }} | |||
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== First comment == | |||
I've added a reference to what is, as far as I can find, the first article (Shimrat, 1956) containing a proof that every space can be written as a quotient of a Hausdorff space; this seems to me like a non-trivial fact, so I didn't think it was appropriate to include the statement with no reference or explanation. Some readers might be interested to know that John Isbell generalized this result in ''A note on complete closure algebras.'' Math. Systems Theory 4 (1969), although that's probably not worth mentioning in this article.] (]) 04:06, 25 August 2009 (UTC) | |||
⚫ | I've just started trying to learn some topology, and I've come across this definition a few times. While I think I can visualise the specific example - two points, disjoint open sets around them - I don't feel I fully understand it. Can anyone help me (and presumably anyone else new to topology)? | ||
Are there any immediate and more graspable consequences that follow from a topological space being Hausdorff? Why is Hausdorff-ness '''important'''? Are most interesting and useful spaces Hausdorff? What do non-Hausdorff spaces look like: are they ugly and weird, are there significant examples that naturally crop up? | Are there any immediate and more graspable consequences that follow from a topological space being Hausdorff? Why is Hausdorff-ness '''important'''? Are most interesting and useful spaces Hausdorff? What do non-Hausdorff spaces look like: are they ugly and weird, are there significant examples that naturally crop up? | ||
⚫ | - ] | ||
⚫ | This line | ||
⚫ | - ] | ||
⚫ | Limits of sequences (when they exist) are unique in Hausdorff spaces. | ||
⚫ | Is a typical example of the ways in which Hausdorff spaces are 'nice'. | ||
⚫ | --] | ||
⚫ | Is the contrapositive of this true? If a space is non-Hausdorff, does this mean that the limits of sequences are not unique? | ||
⚫ | -- ] | ||
⚫ | This is not the ], it is the converse, and it is false. As to your original question: most topological spaces encountered in ] are Hausdorff (most of them are even ], but not all, see e.g. ]). An important non-Hausdorff topology is the Zariski topology in ]. --AxelBoldt | ||
An example of limit behaviour in a non-Hausdorff space:<br> | |||
⚫ | This line | ||
Let X = { 1, 2 } and T = { Ø , X } <br> | |||
T is then a topology on X (called the chaotic topology).<br> | |||
The sequence 1,1,1,1,1... has both 1 and 2 as limits, basically because the topology is incapable of distinguising between them.<br> | |||
A non-Hausdorff space will always have at least one pair of indistinguishable points, so a sequence with more than one limit can be constructed as above. -- Tarquin | |||
I'm pretty sure that one can construct some non-] non-Hausdorff T<sub>1</sub> space where limits of sequences are unique. I think Hausdorff spaces can be characterized by the fact that limits of ''filters'' are unique. --AxelBoldt | |||
⚫ | Limits of sequences (when they exist) are unique in Hausdorff spaces. | ||
"''particularly nice''" - ] | |||
⚫ | Is a typical example of the ways in which Hausdorff spaces are 'nice'. | ||
== A not-so-nice property of non-Hausdorff spaces== | |||
If a space X carries a non-Hausdorff topology, it is impossible for continuous functions with values in the real or complex numbers (or any Hausdorff space Y, for that matter) to separate points. A function <math> f:X\rightarrow Y</math> is said to separate the points x and y if <math>f(x)\neq f(y)</math>. Assume x and y are non-Hausdorff points, i.e. for any two open sets A and B with <math>x\in A, y\in B</math> we have <math>A\cap B\neq\emptyset</math>. Let Y be a Hausdorff space and <math>f:X\rightarrow Y</math> a function separating x and y. Since Y is Hausdorff, there exist disjoint open sets U and V with <math>f(x)\in U, f(y)\in V</math>. Would f be continuous then <math>A=f^{-1}(U)</math> and <math>B=f^{-1}(V)</math> would be disjoint open sets with <math>x\in A, y\in B</math>. But this is impossible, so f cannot be continuous. | |||
⚫ | --] | ||
The importance of this fact is that non-Hausdorff spaces cannot be adequately described by continuous functions on them. | |||
:That could just as well be an argument for why ''Hausdorff spaces'' are not "nice"! (whatever that means...) ] (]) 09:10, 30 March 2009 (UTC) | |||
== Hausdorff redirect == | |||
⚫ | Is the contrapositive of this true? If a space is non-Hausdorff, does this mean that the limits of sequences are not unique? | ||
I feel like the word Hausdorff is used far more often to refer to a property of spaces than it is to refer to Mr. Felix Q Hausdorff. Accordingly, I think ] should redirect here, rather than there. -] <sup>]</sup> 00:06, 3 December 2005 (UTC) | |||
== Closed singletons iff T1, not iff T2 == | |||
In the article it was stated: | |||
For a topological space ''X'', the following are equivalent: | |||
* ''X'' is Hausdorff space. | |||
* Every ] contained in ''X'' is equal to the intersection of all closed neighbourhoods containing it. | |||
This is not true. A set is closed iff it is equal to it's closure, which is the intersection of all closed sets containing the set. Therefore the second condition above means "every singleton is closed". But this is a condition equivalent to the given space being T1. As T1 spaces exist which are not T2, the stated equivalence does not hold. | |||
Therefore I removed from the article the following line: | |||
* Every ] contained in ''X'' is equal to the intersection of all closed neighbourhoods containing it. | |||
--] (]) 13:03, 14 August 2008 (UTC) | |||
:I've restored it, as it's correct. The intersection of the closed ] of a point is ''not'' the same thing as the intersection of the closed sets containing the point. --] (]) 13:45, 14 August 2008 (UTC) | |||
⚫ | -- ] | ||
== Citation problem == | |||
The citation for the statement "in a Hausdorff space every pair of disjoint compact sets can also be separated by neighborhoods" which currently links to http://planetmath.org/?op=getobj&from=objects&id=4193 does not prove the quoted statement. It proves a weaker statement that a point and a compact set in a hausdorff space can be separated by neighborhoods. I have been able to prove the quoted statement based on the ideas from the planetmath proof. I can supply the proof if desired, however I am sure that someone else on here could do it as well. <span style="font-size: smaller;" class="autosigned">— Preceding ] comment added by ] (]) 20:49, 1 August 2011 (UTC)</span><!-- Template:Unsigned IP --> <!--Autosigned by SineBot--> | |||
:I've changed the reference (now p124 of Willard). --] (]) 21:04, 1 August 2011 (UTC) | |||
== Equivalence of Hausdorf and T2 == | |||
⚫ | This is not the ], it is the converse, and it is false. As to your original question: most topological spaces encountered in ] are Hausdorff (most of them are even ], but not all, see e.g. ]). An important non-Hausdorff topology is the Zariski topology in ]. --AxelBoldt | ||
Some authors (Munkres for example) define T2 as a weaker condition than Hausdorf: the T2 axiom states that given any two points, each has a neighborhood that does not contain the other (i.e. not necessarily disjoint). | |||
Is it worth pointing this out in the article or is it hair splitting? Has the topological world moved on from 1975 when Munkres was published? ] (]) 02:19, 3 February 2021 (UTC) | |||
:Nevermind. Misreading Munkres. That's T1 not T2. ] (]) 18:27, 3 February 2021 (UTC) | |||
== "Non-Hausdorff" listed at ] == | |||
] | |||
An editor has identified a potential problem with the redirect ] and has thus listed it ]. This discussion will occur at ] until a consensus is reached, and readers of this page are welcome to contribute to the discussion. <!-- from Template:RFDNote --> <span style="font-family:Segoe Script">]</span> ] 17:21, 3 February 2022 (UTC) | |||
== "R1 space" listed at ] == | |||
] | |||
An editor has identified a potential problem with the redirect ] and has thus listed it ]. This discussion will occur at ] until a consensus is reached, and readers of this page are welcome to contribute to the discussion. <!-- from Template:RFDNote --> ]]] 13:01, 22 April 2022 (UTC) |
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First comment
I've added a reference to what is, as far as I can find, the first article (Shimrat, 1956) containing a proof that every space can be written as a quotient of a Hausdorff space; this seems to me like a non-trivial fact, so I didn't think it was appropriate to include the statement with no reference or explanation. Some readers might be interested to know that John Isbell generalized this result in A note on complete closure algebras. Math. Systems Theory 4 (1969), although that's probably not worth mentioning in this article.67.85.181.241 (talk) 04:06, 25 August 2009 (UTC)
I've just started trying to learn some topology, and I've come across this definition a few times. While I think I can visualise the specific example - two points, disjoint open sets around them - I don't feel I fully understand it. Can anyone help me (and presumably anyone else new to topology)?
Are there any immediate and more graspable consequences that follow from a topological space being Hausdorff? Why is Hausdorff-ness important? Are most interesting and useful spaces Hausdorff? What do non-Hausdorff spaces look like: are they ugly and weird, are there significant examples that naturally crop up? - Stuart Presnell
This line
Limits of sequences (when they exist) are unique in Hausdorff spaces.
Is a typical example of the ways in which Hausdorff spaces are 'nice'. --Matthew Woodcraft
Is the contrapositive of this true? If a space is non-Hausdorff, does this mean that the limits of sequences are not unique? -- Stuart Presnell
This is not the contrapositive, it is the converse, and it is false. As to your original question: most topological spaces encountered in analysis are Hausdorff (most of them are even metric spaces, but not all, see e.g. weak topology). An important non-Hausdorff topology is the Zariski topology in algebraic geometry. --AxelBoldt
An example of limit behaviour in a non-Hausdorff space:
Let X = { 1, 2 } and T = { Ø , X }
T is then a topology on X (called the chaotic topology).
The sequence 1,1,1,1,1... has both 1 and 2 as limits, basically because the topology is incapable of distinguising between them.
A non-Hausdorff space will always have at least one pair of indistinguishable points, so a sequence with more than one limit can be constructed as above. -- Tarquin
I'm pretty sure that one can construct some non-first-countable non-Hausdorff T1 space where limits of sequences are unique. I think Hausdorff spaces can be characterized by the fact that limits of filters are unique. --AxelBoldt
"particularly nice" - Zoe
A not-so-nice property of non-Hausdorff spaces
If a space X carries a non-Hausdorff topology, it is impossible for continuous functions with values in the real or complex numbers (or any Hausdorff space Y, for that matter) to separate points. A function is said to separate the points x and y if . Assume x and y are non-Hausdorff points, i.e. for any two open sets A and B with we have . Let Y be a Hausdorff space and a function separating x and y. Since Y is Hausdorff, there exist disjoint open sets U and V with . Would f be continuous then and would be disjoint open sets with . But this is impossible, so f cannot be continuous.
The importance of this fact is that non-Hausdorff spaces cannot be adequately described by continuous functions on them.
- That could just as well be an argument for why Hausdorff spaces are not "nice"! (whatever that means...) Thehotelambush (talk) 09:10, 30 March 2009 (UTC)
Hausdorff redirect
I feel like the word Hausdorff is used far more often to refer to a property of spaces than it is to refer to Mr. Felix Q Hausdorff. Accordingly, I think Hausdorff should redirect here, rather than there. -lethe 00:06, 3 December 2005 (UTC)
Closed singletons iff T1, not iff T2
In the article it was stated:
For a topological space X, the following are equivalent:
- X is Hausdorff space.
- Every singleton set contained in X is equal to the intersection of all closed neighbourhoods containing it.
This is not true. A set is closed iff it is equal to it's closure, which is the intersection of all closed sets containing the set. Therefore the second condition above means "every singleton is closed". But this is a condition equivalent to the given space being T1. As T1 spaces exist which are not T2, the stated equivalence does not hold.
Therefore I removed from the article the following line:
- Every singleton set contained in X is equal to the intersection of all closed neighbourhoods containing it.
--87.205.171.230 (talk) 13:03, 14 August 2008 (UTC)
- I've restored it, as it's correct. The intersection of the closed neighbourhoods of a point is not the same thing as the intersection of the closed sets containing the point. --Zundark (talk) 13:45, 14 August 2008 (UTC)
Citation problem
The citation for the statement "in a Hausdorff space every pair of disjoint compact sets can also be separated by neighborhoods" which currently links to http://planetmath.org/?op=getobj&from=objects&id=4193 does not prove the quoted statement. It proves a weaker statement that a point and a compact set in a hausdorff space can be separated by neighborhoods. I have been able to prove the quoted statement based on the ideas from the planetmath proof. I can supply the proof if desired, however I am sure that someone else on here could do it as well. — Preceding unsigned comment added by 152.14.226.95 (talk) 20:49, 1 August 2011 (UTC)
- I've changed the reference (now p124 of Willard). --Zundark (talk) 21:04, 1 August 2011 (UTC)
Equivalence of Hausdorf and T2
Some authors (Munkres for example) define T2 as a weaker condition than Hausdorf: the T2 axiom states that given any two points, each has a neighborhood that does not contain the other (i.e. not necessarily disjoint).
Is it worth pointing this out in the article or is it hair splitting? Has the topological world moved on from 1975 when Munkres was published? Mr. Swordfish (talk) 02:19, 3 February 2021 (UTC)
- Nevermind. Misreading Munkres. That's T1 not T2. Mr. Swordfish (talk) 18:27, 3 February 2021 (UTC)
"Non-Hausdorff" listed at Redirects for discussion
An editor has identified a potential problem with the redirect Non-Hausdorff and has thus listed it for discussion. This discussion will occur at Misplaced Pages:Redirects for discussion/Log/2022 January 27#Non-Hausdorff until a consensus is reached, and readers of this page are welcome to contribute to the discussion. Jay (talk) 17:21, 3 February 2022 (UTC)
"R1 space" listed at Redirects for discussion
An editor has identified a potential problem with the redirect R1 space and has thus listed it for discussion. This discussion will occur at Misplaced Pages:Redirects for discussion/Log/2022 April 22#R1 space until a consensus is reached, and readers of this page are welcome to contribute to the discussion. 1234qwer1234qwer4 13:01, 22 April 2022 (UTC)
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