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1. • CommentRowNumber1.
   • CommentAuthorUrs
   • CommentTimeJan 7th 2011
   • (edited Jan 7th 2011)
   • PermaLink
   Author: Urs
   Format: MarkdownItexHere is a nice simple test case that should serve to provide a good short example entry of the [[Annals:HomePage|nJournal]]: Carlos Simpson had had occasion to cite the $n$Lab entry [[geometric realization of simplicial topological spaces]] as citaton [77] in his recent preprint. * Carlos Simpson, _Local systems on proper algebraic $V$-manifolds_ (<a href="http://arxiv.org/PS_cache/arxiv/pdf/1010/1010.3363v1.pdf">pdf</a>) It would be in everybody's interest if instead of just the URL to the $n$Lab, he could cite this as a stable peer-reviewed entry in the $n$Journal. Would anyone volunteer to formally referee the entry? It is very short and the material should be pretty standard. But it may be a good example and manifestly there is already need for it. (Since I am not a member of the editorial board to-be-formed, my call for referees here is not fully qualified, so I assume it would be useful in this case if we had non-anonymous referees, so that their name would serve as sufficient indication of expertise. )

   Here is a nice simple test case that should serve to provide a good short example entry of the nJournal:

   Carlos Simpson had had occasion to cite the $n$Lab entry geometric realization of simplicial topological spaces as citaton [77] in his recent preprint.

   • Carlos Simpson, Local systems on proper algebraic $V$-manifolds (pdf)

   It would be in everybody’s interest if instead of just the URL to the $n$Lab, he could cite this as a stable peer-reviewed entry in the $n$Journal.

   Would anyone volunteer to formally referee the entry? It is very short and the material should be pretty standard. But it may be a good example and manifestly there is already need for it.

   (Since I am not a member of the editorial board to-be-formed, my call for referees here is not fully qualified, so I assume it would be useful in this case if we had non-anonymous referees, so that their name would serve as sufficient indication of expertise. )

2. • CommentRowNumber2.
   • CommentAuthorTim_Porter
   • CommentTimeJan 7th 2011
   • PermaLink
   Author: Tim_Porter
   Format: MarkdownItexUrs: the link does not work.

   Urs: the link does not work.

3. • CommentRowNumber3.
   • CommentAuthordomenico_fiorenza
   • CommentTimeJan 7th 2011
   • (edited Jan 7th 2011)
   • PermaLink
   Author: domenico_fiorenza
   Format: MarkdownItexcan I edit [[geometric realization of simplicial topological spaces]] before we sumit it to a referee? (nothing crucial, just cosmetics)

   can I edit geometric realization of simplicial topological spaces before we sumit it to a referee? (nothing crucial, just cosmetics)

4. • CommentRowNumber4.
   • CommentAuthorTim_Porter
   • CommentTimeJan 7th 2011
   • (edited Jan 7th 2011)
   • PermaLink
   Author: Tim_Porter
   Format: MarkdownItexThe correct link is [here](http://ncatlab.org/nlab/show/geometric+realization+of+simplicial+topological+spaces)

   The correct link is here

5. • CommentRowNumber5.
   • CommentAuthorUrs
   • CommentTimeJan 7th 2011
   • PermaLink
   Author: Urs
   Format: MarkdownItex> Urs: the link does not work. Fixed it. > can I edit geometric realization of simplicial topological spaces before we sumit it to a referee? (nothing crucial, just cosmetics) CERTAINLY! And even once it is submitted. And always. And not only are you allowed to, but you are encouraged to. All that changes with the submission for the $n$Lab entry is that there will be a remark being inserted that notifies whether some and which of its versions have been formally peer-reviewed.

   Urs: the link does not work.

   Fixed it.

   can I edit geometric realization of simplicial topological spaces before we sumit it to a referee? (nothing crucial, just cosmetics)

   CERTAINLY! And even once it is submitted. And always. And not only are you allowed to, but you are encouraged to.

   All that changes with the submission for the $n$Lab entry is that there will be a remark being inserted that notifies whether some and which of its versions have been formally peer-reviewed.

6. • CommentRowNumber6.
   • CommentAuthordomenico_fiorenza
   • CommentTimeJan 7th 2011
   • PermaLink
   Author: domenico_fiorenza
   Format: MarkdownItex>CERTAINLY! And even once it is submitted. And always. And not only are you allowed to, but you are encouraged to. I know, it's just I'd like to clean that entry a bit before we freeze a version by peer-reviewing. The changes I have in mind are minimal: making two definitions of _good in the sense of Segal_ and _proper in the sense of May_, a statement that _goodnees implies properness_ citing David Roberts-Danny Stevenson unpublished work and possibly providing a link to it. Also we need a reference for the fact that if $X$ is proper then $||X||\to |X|$ is a homotopy equivalence, and be precise whether this is a weak homotopy equivalence or a homotopy equivalence. Finally we should add a reference to the Tammo tom Dieck work where the proof for the "$X$ good case" can be found.

   CERTAINLY! And even once it is submitted. And always. And not only are you allowed to, but you are encouraged to.

   I know, it’s just I’d like to clean that entry a bit before we freeze a version by peer-reviewing. The changes I have in mind are minimal: making two definitions of good in the sense of Segal and proper in the sense of May, a statement that goodnees implies properness citing David Roberts-Danny Stevenson unpublished work and possibly providing a link to it. Also we need a reference for the fact that if $X$ is proper then $||X||\to |X|$ is a homotopy equivalence, and be precise whether this is a weak homotopy equivalence or a homotopy equivalence. Finally we should add a reference to the Tammo tom Dieck work where the proof for the “$X$ good case” can be found.

7. • CommentRowNumber7.
   • CommentAuthordomenico_fiorenza
   • CommentTimeJan 7th 2011
   • PermaLink
   Author: domenico_fiorenza
   Format: MarkdownItexI've started editing the entry. Have to break now for a while, will complete editing later (in a short time).

   I’ve started editing the entry. Have to break now for a while, will complete editing later (in a short time).

8. • CommentRowNumber8.
   • CommentAuthordomenico_fiorenza
   • CommentTimeJan 7th 2011
   • PermaLink
   Author: domenico_fiorenza
   Format: MarkdownItexI've now done my edits. There's a weird problem with the display of $||X||$ I've been unable to solve (the two $|$'s appear extremely spaced to me).

   I’ve now done my edits. There’s a weird problem with the display of $||X||$ I’ve been unable to solve (the two $|$’s appear extremely spaced to me).

9. • CommentRowNumber9.
   • CommentAuthorAndrew Stacey
   • CommentTimeJan 7th 2011
   • PermaLink
   Author: Andrew Stacey
   Format: MarkdownItexUse `\Vert`: `$\Vert X \Vert$` produces $\Vert X \Vert$

   Use \Vert: $\Vert X \Vert$ produces $\Vert X \Vert$

10. • CommentRowNumber10.
    • CommentAuthordomenico_fiorenza
    • CommentTimeJan 7th 2011
    • PermaLink
    Author: domenico_fiorenza
    Format: MarkdownItexDone. It's better, but within the _proposition_ enviroment (or the like) the result seems still not to be completely satisfactory.

    Done. It’s better, but within the proposition enviroment (or the like) the result seems still not to be completely satisfactory.

11. • CommentRowNumber11.
    • CommentAuthorUrs
    • CommentTimeJan 7th 2011
    • PermaLink
    Author: Urs
    Format: MarkdownItexI have added a bit more formatting (the missing Definition- and the missing Proof-Environment), made RobertStevenson a reference and added pointers to it (this way, once it is published, we don't need to change the entry text, but just update the list of references) and added some cross-hyperlinks within the entry and some out of it. We need [[closed cofibration]], by the way.

    I have added a bit more formatting (the missing Definition- and the missing Proof-Environment), made RobertStevenson a reference and added pointers to it (this way, once it is published, we don’t need to change the entry text, but just update the list of references) and added some cross-hyperlinks within the entry and some out of it. We need closed cofibration, by the way.

12. • CommentRowNumber12.
    • CommentAuthorMike Shulman
    • CommentTimeJan 7th 2011
    • PermaLink
    Author: Mike Shulman
    Format: MarkdownItex`${\Vert X \Vert}$` with braces gets the spacing better, just as for single verts `${|X|}$`. I changed the link to [[simplicial topological space]] to point to [[nice simplicial topological space]], which seems more relevant. I observe that there is also substantial duplication between [[geometric realization of simplicial topological spaces]] and [[nice simplicial topological space]]. I would like to add a comment to the effect that *proper* simplicial topological spaces are just those that are [[Reedy model structure|Reedy cofibrant]] relative to the [[Strøm model structure]], but I'm unsure which of those pages would be more appropriate for it.

    ${\Vert X \Vert}$ with braces gets the spacing better, just as for single verts ${|X|}$.

    I changed the link to simplicial topological space to point to nice simplicial topological space, which seems more relevant. I observe that there is also substantial duplication between geometric realization of simplicial topological spaces and nice simplicial topological space. I would like to add a comment to the effect that proper simplicial topological spaces are just those that are Reedy cofibrant relative to the Strøm model structure, but I’m unsure which of those pages would be more appropriate for it.

13. • CommentRowNumber13.
    • CommentAuthorTobyBartels
    • CommentTimeJan 8th 2011
    • PermaLink
    Author: TobyBartels
    Format: MarkdownItex>`${\Vert X \Vert}$` with braces gets the spacing better, just as for single verts `${|X|}$`. Yes. This is basically an iTeX problem (possibly implicit in MathML, possibly something that could be fixed with complicated coding).

    ${\Vert X \Vert}$ with braces gets the spacing better, just as for single verts ${|X|}$.

    Yes. This is basically an iTeX problem (possibly implicit in MathML, possibly something that could be fixed with complicated coding).

14. • CommentRowNumber14.
    • CommentAuthorDavidRoberts
    • CommentTimeJan 9th 2011
    • (edited Jan 9th 2011)
    • PermaLink
    Author: DavidRoberts
    Format: MarkdownItexAs at [[nice simplicial topological space]], it would be worth pointing out that good $\Rightarrow$ proper has its roots in a paper by [Lewis](http://ncatlab.org/nlab/show/nice+simplicial+topological+space#Lewis), but is treated like a folk theorem. Danny and I have a generalisation of this result for a bicomplete [[topological concrete category]]. I've also linked 'closed cofibration' to [[Hurewicz cofibration]], where it is discussed and defined.

    As at nice simplicial topological space, it would be worth pointing out that good $\Rightarrow$ proper has its roots in a paper by Lewis, but is treated like a folk theorem. Danny and I have a generalisation of this result for a bicomplete topological concrete category. I’ve also linked ’closed cofibration’ to Hurewicz cofibration, where it is discussed and defined.

15. • CommentRowNumber15.
    • CommentAuthorUrs
    • CommentTimeJan 9th 2011
    • PermaLink
    Author: Urs
    Format: MarkdownItexWe still don't have a referee, by the way.

    We still don’t have a referee, by the way.

16. • CommentRowNumber16.
    • CommentAuthordomenico_fiorenza
    • CommentTimeJan 9th 2011
    • PermaLink
    Author: domenico_fiorenza
    Format: MarkdownItexIt seems that having the eyes of a potential referee pointed on [[ geometric realization of simplicial topological spaces]] and related entries is improving them at a remarkable rate :)

    It seems that having the eyes of a potential referee pointed on geometric realization of simplicial topological spaces and related entries is improving them at a remarkable rate :)

17. • CommentRowNumber17.
    • CommentAuthorUrs
    • CommentTimeJan 10th 2011
    • (edited Jan 11th 2011)
    • PermaLink
    Author: Urs
    Format: MarkdownItexI have added some further material: * stated the homeomorphism $|Sing(X_\bullet)| \simeq_{iso} | d Sing(X_\bullet)_\bullet |$ * split off the section with discussion of nice simplicial spaces as a separate subsection, so that we can later on easily sync it with [[nice simplicial topological space]]; * added the statement that proper = cofibrant in $[\Delta^{op}, Top_{Strom}]_{Reedy}$; * added in a Proof-environment the remark that this implies that realizaiton of proper spaces is their homotopy colimit; * added the statement that $|Sing X_\bullet| \to X_\bullet$ is cofibrant replacement in the Reedy structure (hence "properification") * added the reference for "good implies proper".

    I have added some further material:

    • stated the homeomorphism $|Sing(X_\bullet)| \simeq_{iso} | d Sing(X_\bullet)_\bullet |$

    • split off the section with discussion of nice simplicial spaces as a separate subsection, so that we can later on easily sync it with nice simplicial topological space;

    • added the statement that proper = cofibrant in $[\Delta^{op}, Top_{Strom}]_{Reedy}$;

    • added in a Proof-environment the remark that this implies that realizaiton of proper spaces is their homotopy colimit;

    • added the statement that $|Sing X_\bullet| \to X_\bullet$ is cofibrant replacement in the Reedy structure (hence “properification”)

    • added the reference for “good implies proper”.

18. • CommentRowNumber18.
    • CommentAuthorDavidRoberts
    • CommentTimeJan 11th 2011
    • (edited Jan 11th 2011)
    • PermaLink
    Author: DavidRoberts
    Format: MarkdownItex>stated the homeomorphism $|X_\bullet| = | diag (Sing X_\bullet)_\bullet |$ I don't think this is true. If $X$ is a space considered as a constant simplicial space, then $|X| = X$, $diag(Sing X) = Sing X$, and we know that $X$ is not homeomorphic to $|Sing X|$, only weakly homotopy equivalent.

    stated the homeomorphism $|X_\bullet| = | diag (Sing X_\bullet)_\bullet |$

    I don’t think this is true. If $X$ is a space considered as a constant simplicial space, then $|X| = X$, $diag(Sing X) = Sing X$, and we know that $X$ is not homeomorphic to $|Sing X|$, only weakly homotopy equivalent.

19. • CommentRowNumber19.
    • CommentAuthorUrs
    • CommentTimeJan 11th 2011
    • (edited Jan 11th 2011)
    • PermaLink
    Author: Urs
    Format: MarkdownItexSorry, I meant the homeo $|Sing(X_\bullet)| = |diag Sing(X_\bullet)_\bullet|$.

    Sorry, I meant the homeo $|Sing(X_\bullet)| = |diag Sing(X_\bullet)_\bullet|$.