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    • Zoran,

      I wanted to add a reference to holomorphic Chern-Simons theory, only to realize that the entry didn't exist yet. Didn't you recently write something about holomorphic CS? I can't find it right now...

    • Page created, but author did not leave any comments.

      v1, current

    • fix wrong definition of free group action

      Alexey Muranov

      diff, v32, current

    • Added a “warning” for something that tripped me up: the classifying topos of a classical first-order theory is typically not Boolean, even though the classifying pretopos is Boolean. For a topos to be Boolean is much stronger – as Blass and Scedrov showed, it implies 0\aleph_0-categoricity.

      diff, v31, current

    • Added references for the path integral approach.

      diff, v4, current

    • starting something – not done yet

      v1, current

    • created a currently fairly empty entry quantum measurement, just so as to have a place where to give a commented pointer to the article

      • Klaas Landsman, Robin Reuvers, A Flea on Schrödinger’s Cat, Found. Phys. 43, 373-407 (2013) (arXiv:1210.2353)

    • added an Idea-section to Mackey functor (which used to be just a list of references). Also added more references.

    • the entry group algebra had been full of notation mismatch and also of typos. I have reworked it now.

    • Added doi and pointer to relevant sections to

      • Marcelo Aguilar, Samuel Gitler, Carlos Prieto, section 6 of Algebraic topology from a homotopical viewpoint, Springer (2002) (toc pdf, doi:10.1007/b97586)

        (EM-spaces are constructed in section 6, the cohomology theory they represent is discussed in section 7.1, and its equivalence to singular cohomology is Corollary 12.1.20)

      diff, v25, current

    • brief category:people-entry for hyperlinking references

      v1, current

    • brief category:people-entry for hyperlinking references

      v1, current

    • following discussion here I am starting an entry with a bare list of references (sub-sectioned), to be !include-ed into the References sections of relevant entries (mainly at homotopy theory and at algebraic topology) for ease of updating and syncing these lists.

      The organization of the subsections and their items here needs work, this is just a start. Let’s work on it.

      I’ll just check now that I have all items copied, and then I will !include this entry here into homotopy theory and algebraic topology. It may best be viewed withing these entries, because there – but not here – will there be a table of contents showing the subsections here.

      v1, current

    • added redirects for abbreviations of his name, plus some publications. Also added a (for the moment Grey link) to differential category, which hopefully I will be able to add a sutb for later.

      diff, v4, current

    • Page created, but author did not leave any comments.

      Anonymous

      v1, current

    • Added a reference to the following which provides a proof of the Arnold conjecture

      • Mohammed Abouzaid, Andrew J. Blumberg, Arnold Conjecture and Morava K-theory, (arXiv:2103.01507)

      diff, v24, current

    • brief category:people-entry for hyperlinking references

      v1, current

    • added to tmf a section that gives an outline of the proof strategy for how to compute the homotopy groups of the tmftmf-spectrum from global sections of the E E_\infty-structure sheaf on the moduli stack of elliptic curves.

      A point which I wanted to emphasize is that

      1. The problem of constructing tmftmf as global sections of an \infty-structure sheaf has a tautological solution: take the underlying space to be SpectmfSpec tmf.

      2. From this tautological but useless solution one gets to the one that is used for actual computations by one single crucial fact:

        In the \infty-topos over the \infty-site of formal duals of E E_\infty-rings, the dual SpecMUSpec M U of the Thom spectrum, is a well-supported object. the terminal morphism

        SpecMU* Spec M U \to *

        in the \infty-topos is an effective epimorphism, hence a covering of the point.

      Using this we can pull back the tautological solution of the problem to the cover and then compute there. This is what actually happens in practice: the decategorification of the pullback of SpectmfSpec tmf to SpecMUSpec M U is the moduli stack of elliptic curves. And it is a happy coincidence that despite this drastic decategorification, there is still enough information left to compute 𝒪Spectmf\mathcal{O} Spec tmf on that.

    • I added a clearer “The idea” section for Adams operation, and changed the word “functorial” to “natural” in a number of places, because while various sources do say the Adams operations are functorial, they must really be natural transformations from the functor K:TopAbGpK: Top \to AbGp to itself.

      diff, v10, current

    • Create a new page to keep record of PhD theses in category theory (with links to the documents where possible), particularly older ones that are harder to discover independently. At the moment, this is just a stub, but I plan to fill it out more when I have the chance.

      v1, current

    • brief category:people-entry for hyperlinking references

      v1, current

    • brief category:people-entry for hyperlinking references

      v1, current

    • brief category:people-entry for hyperlinking references

      v1, current

    • brief category:people-entry for hyperlinking references

      v1, current

    • added various references, notably on computation of graviton scattering amplitudes.

      diff, v15, current

    • Page created, but author did not leave any comments.

      Anonymous

      v1, current

    • Added to Hopf monad the Bruguières-Lack-Virelizier definition and some properties.

    • Added section on Cluster spaces, which generalize Convergence spaces.

      Anonymous

      diff, v29, current

    • adding the reference and doi link for the second article

      Frédéric

      diff, v4, current

    • brief category:people-entry for hyperlinking references

      v1, current

    • I moved most of the contents of the material from preconvergence space to a different article, since “preconvergence space” is evidently defined in the existing literature as a different thing than what the original article says.

      I also added a disclaimer at the top of the page that the name of the article is just a placeholder name.

      v1, current

    • added table of contents and section headers and a link to filter article in a related concepts section

      Anonymouse

      diff, v4, current

    • I’m not entirely happy with the introduction (“Statement”) to the page axiom of choice. On the one hand, it implies that the axiom of choice is something to be considered relative to a given category CC (which is reasonable), but it then proceeds to give the external formulation of AC for such a CC, which I think is usually not the best meaning of “AC relative to CC”. I would prefer to give the Statement as “every surjection in the category of sets splits” and then discuss later that analogous statements for other categories (including both internal and external ones) can also be called “axioms of choice” — but with emphasis on the internal ones, since they are what correspond to the original axiom of choice (for sets) in the internal logic.

      (I would also prefer to change “epimorphism” for “surjection” or “regular/effective epimorphism”, especially when generalizing away from sets.)

    • Added a literature reference to icon. Started some systematic notes on icons for monoidal-enriched bicategories, which I am currently using for something. Think the broken-off state of that section is not intolerable, in particular since I have seen similar work in progress on the nLab. Intend to continue them soon.

    • Noticing that the term “gauge field” used to conflictingly be redirecting both to “gauge theory” and to “field (physics)”, neither of which is satisfactory as a redirect, I am giving the term its own entry hereby.

      But it’s just a stub entry for now.

      v1, current

    • am experimenting with this overview table, eventually meant to be !include-ed into relevant entries

      v1, current

    • Started page on generalized symmetries, with brief description of main Idea.

      v1, current

    • I have expanded vertex operator algebra (more references, more items in the Properties-section) in partial support to a TP.SE answer that I posted here

    • Here is old discussion that used to be in the entry graph and which hereby I am moving to the relevant talk-page (i.e.: the nnForum thread with the same title as the entry, namely this one).

      [begin forwarded discussion]

      Obsolete discussion may also be found in the History at Version 24.

      Toby: OK, I've completely redone the page above; this is how it looked before. In particular, I am defining things case by case, rather than choice by choice (88 cases, rather than 33 choices with 22 options each). Feedback please!

      (One obvious possibility is that the best style of definition is a mixture of the two previous styles: doing undirected and directed graphs separately, but in each case listing the two choices —loops or no loops, multiple edges or no multiple edges— as I had done before.)

      Eric: Ugh. I see that quite some discussion went on here and I’m late to the party. This page is not beautiful nor remotely nn-categorical in my opinion. We already had a page that I was very happy with on directed graphs.

      Isn’t there some way to state very simply:

      A graph is a functor…

      Here is a humble attempt…

      +– {: .un_defn}

      Definition

      An abstract graph XX is a category with

      • one object X 0X_0, called the object of vertices;

      • one object X 1X_1, called the object of edges;

      • one morphism e:X 1???e : X_1 \to ???, called the ???;

      • together with identity morphisms.

      A graph is a functor G:XG: X\to Set.

      More generally, a graph in a category CC is a functor G:XCG : X \to C. =–

      Toby: First, it depends on what kind of ’graph’ you mean.

      Let's take a simple undirected graph. Then the answer is no, since the definition of a simple graph is not (despite the name) as simple as the definition of digraph (directed pseudograph). Whereas a digraph consists of just VV, EE, and d:EV 2d: E \to V^2, a simple graph consists of VV, EE, and an injection d:E(V2)d: E \to \left({V \atop 2}\right). The two problems here are: how do you say that dd is an injection? and how do you describe a function E(V2)E \to \left({V \atop 2}\right) in terms of functions among VV and EE? (A map EV 2E \to V^2 can be done; that's the same as two maps EVE \to V.) You can describe these things more internally, of course (say by replacing ’injective function’ with ’monomorphism’), but there's no category XX such that a simple graph is precisely a functor from XX to SetSet.

      In fact, the only kind of graph above that can be defined as a functor from XX to SetSet for some fixed ’abstract general’ category XX is directed pseudograph, the kind of graph discussed at digraph. Between that, and the fact that every strict category has an underlying digraph, it's no surprise that this is the sort of graph that category theorists like. But it's not the sort of graph that graph theorists like so much!

      It would be worth discussing what sort of graphs can be internalised in what sort of categories. Those graphs that allow loops are easier; I think that I can do them! For the graphs without loops, I haven't even decided what's the best way to phrase the definition in constructive mathematics. (Luckily it doesn't matter for finite graphs.)

      [forwarded discussion continued in next comment]

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