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I have changed the title of this article, as well as references to the object within it. Use of the term “Hawaiian Earring” is objected to by Hawaiian mathematicians. Please see these two threads, one by native Hawaiian and math PhD Dr. Marissa Loving, and the other by an expert on the Hawaiian Earring, Dr. Jeremy Brazas.
https://twitter.com/MarissaKawehi/status/1406244897611522049
https://twitter.com/jtbrazas/status/1406652385263501319
I have retitled the article “Shrinking wedge of circles”, which is the name used for this space in Hatcher’s “Algebraic Topology”. I have a retained a note in the body of the article that the space is sometimes referred to as the “Hawaiian earring space”.
This small change in name helps to make mathematics a more inclusive and just field, especially in consideration of the historical marginalization and exclusion of indigenous mathematicians. By taking this action, the nLab site can help to spread a change in language more widely, including on other math reference sites.
I hope that this change is readily accepted and approved by the nLab community. Thank you!
Justin Lanier
added at cobordism hypothesis a pointer to
where the case for -categories is spelled out and proven in detail.
noticed that we didn’t have complex Lie group, so I put in a bare minimum. Also a stub for complex Lie algebra. Just so that it’s there.
added a table with some homotopy groups in the unstable range to orthogonal group – Homotopy groups
Added a diagram at commutative algebraic theory using the totally awesome SVG Editor.
it now does itex!
This was a ridiculously simple diagram to do.
added pointer to
In the article connection on a cubical set the definition of a connection uses two types of maps, denoted Γ^+_i and Γ^-_i. Roughly, the former corresponds to a map of cubes that takes the minimum of some coordinates, whereas the latter takes the maximum of some coordinates.
However, in the book by Brown-Higgins-Sivera in Definition 13.1.3, page 446, only the maps Γ^-_i are used. There they are denoted simply by Γ_i. The paper by Maltsiniotis about the strict test category of cubes with connection also uses the same definition.
Which definition is correct? What is the reference for nLab’s definition and why does it deviate from the definition of Brown-Higgins-Sivera?
In the past we had some discussion here about why simplicial methods find so much more attention than cubical methods in higher category theory. The reply (as far as I am concerned at least) has been: because the homotopy theory = weak oo-groupoid theory happens to be well developed for simplicial sets and not so well developed for cubical sets. Historically this apparently goes back to the disappointment that the standard cubical geometric realization to Top does not behave as nicely as the one on simplicial sets does.
Still, it should be useful to have as much cubical homotopy theory around as possible. Many structures are more naturally cubical than simplicial.
So as soon as the Lab comes up again (we are working on it...) I want to create a page model structure on cubical sets and record for instance this reference here:
Jardine, Cubical homotopy theory: a beginning
Made some further tweaks at cubical set. Hopefully the definitions of the boundary functor, and of a horn, are correct now.
Am continuing to work on homotopy groups of a cubical Kan complex.
Added another reference.
I was chatting with Robin Cockett yesterday at SYCO1. In a talk Robin claims to be after
The algebraic/categorical foundations for differential calculus and differential geometry.
It would be good to see how this approach compares with differential cohesive HoTT.
This appears to be called Stigler’s law of eponymy on Wikipedia. Is there good reason to have a separate term?
I am splitting off Gelfand duality from Gelfand spectrum. Want to state the actual equivalence theorem here. But just a moment…
tried to improve the entry coproduct a little
I have touched the formatting at direct sum and then expanded a little:
Added a paragraph to the Idea-section such that something familiar is mentioned right at the beginning;
Expanded on the example of direct sums in by drawing the cocone diagrams and explicitly mentioning the universal property.
Mentioned the relation to formal linear combinations.
Mentioned the examples of direct sums of modules.
added below the very first definition at kernel a remark that spells out the universal property more explicitly. Also added mentioning of some basic examples.
New entry linearly compact module with many redirects, just to record some references.
New book entry Abelian categories with applications to rings and modules, to record its contents.
Added
Since it was mentioned by Urs on g+, I thought I’d start mysterious duality. Maybe not a great name when someone discovers how it works (as someone claims to have done here).
Added a description of several different approaches to geometric theory.
I gave CW-pair its own entry.
added references to essentially algebraic theory. Also equipped the text with a few more hyperlinks.
stub for confinement, but nothing much there yet. Just wanted to record the last references there somewhere.
added pointer to discussion of models of neutron stars by Skyrmions:
Created categorical model of dependent types, describing the various different ways to strictify category theory to match type theory and their interrelatedness. I wasn’t sure what to name this page — or even whether it should be part of some other page — but I like having all these closely related structures described in the same place.
created worldline formalism to go with this Physics.SE answer
for completeness, I have added pointer to
for proof of the Hausdorff property of CW complexes
added publication data to:
started some minimum at convolution product of distributions
added publication data for:
added statement of and references to the weak equivalence with the Fulton-MacPherson operad (here)
added the same statement also at Fulton-MacPherson operad
Max New: at (129.10.9.38) has put a query on the generalized universal bundle entry. It says:
I don’t understand the above diagram, what is the point in question? and how does this relate to the universal bundle? In particular, there is a sequence below that has a map from but I don’t see how to construct that from the above.
So I think this is a typo, but I don’t know enough to correct it.
started stub for bounded geometric morphism
I created separator, while having the nagging feeling that we already have this entry. Of course after creating it I remembered the page generator.
So we should merge the stuff. Might this be an occasion to merge away from generator? A set of “generating objects” also means other things than “separating objects” (notably colimit generation). So I’d be inclined to move all material to separator. That would also allow to drop the warning at the beginning of generator.
am splitting this off from Lie algebra, for ease of cross-linking.