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Vanilla 1.1.10 is a product of Lussumo. More Information: Documentation, Community Support.
I have spent some minutes starting to put some actual expository content into the Idea-section on higher gauge theory. Needs to be much expanded, still, but that’s it for the moment.
Added (not very elegantly) the relation to Meyer-Vietoris sequence at Dold-Thom theorem.
Somebody named Adam left a comment box a while ago at premonoidal category saying that naturality of the associator requires three naturality squares. I believe that this is true when phrased explicitly in terms of one-variable functors, but the slick approach using the “funny tensor product” allows us to rephrase it as a single natural transformation between functors . I’ve edited the page accordingly. I also added the motivating example (the Kleisli category of a strong monad) and a link to sesquicategory.
There is a comment on the page that “It may be possible to weaken the above make a symmetric monoidal 2-category, in which a monoid object is precisely a premonoidal category”. However, the Power-Robinson paper says that “We remark that is not a 2-functor,” which seems to throw some cold water on the obvious approach to that idea. Was the thought to define a different 2-categorical structure on than the usual one, e.g. using unnatural transformations? It seems that at least one would still have to explicitly require centrality of the coherence isomorphisms.
am finally splitting this off from Hopf invariant
added inspire and doi identifiers for
added doi for
I have been making trivial edits (adding references, basic statements, cross-links ) to Hopf invariant and a bunch of related entries, such as Kervaire invariant, Hopf invariant one problem, Arf-Kervaire invariant problem, normed division algebra.
created an entry for the statement that the kernel of integration is the exact differential forms with a pointer to a proof, and cross-linked with Lie integration and de Rham theorem
brief category:people-entry for hyperlinking references at L-infinity algebra and perturbative quantum field theory
added pointer to these two recent references, identifying further -algebra structure in Feynman amplitudes/S-matrices of perturbative quantum field theory:
Markus B. Fröb, Anomalies in time-ordered products and applications to the BV-BRST formulation of quantum gauge theories (arXiv:1803.10235)
Alex Arvanitakis, The -algebra of the S-matrix (arXiv:1903.05643)
New entry representable morphism, in the sense of Grothendieck school. The notion is used at closed immersion of schemes where I just made some changes.
I have added to M5-brane a fairly detailed discussion of the issue with the fractional quadratic form on differential cohomology for the dual 7d-Chern-Simons theory action (from Witten (1996) with help of Hopkins-Singer (2005)).
In the new section Conformal blocks and 7d Chern-Simons dual.
brief category:people-entry for hyperlinking references at gauged WZW model
started gauged WZW model, but no content yet, am just recording some references…
added pointer to yesterday’s
Edited the text in the Idea-section, such as to make the terms monoidal category, monoid objects, module objects appear.
started universal coefficient theorem
I noticed that we had no entry density, so I very briefly created one. While cross-linking it, I noticed that at volume form there is related discussion re “pseudo-volume forms”. Maybe somebody here would enjoy to add a bit more glue? (I won’t at the moment.)
Has anyone written down an analogue for -toposes of the (hyperconnected, localic) factorization system for 1-toposes? In particular, is it known that -localic -toposes form a reflective subcategory of all -toposes?