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I added a little bit of material to ordered field, namely that a field is orderable iff it is a real field (i.e., is not a sum of squares). More importantly, at real closed field, I have addressed an old query of Colin Tan:
Colin: Is it true that real closure is an adjoint construction to the forgetful functor from real closed fields to orderable fields?
by writing out a proof (under Properties) that indeed the forgetful functor from category of real closed fields and field homomorphisms to the category of real fields and field homomorphisms has a left adjoint (the real closure). Therefore I am removing this query from that page over to here.
I added to field a mention of some other constructive variants of the definition, with a couple more references.
concerning the discussion here: notice that an entry rig category had once been created, already.
brief category:people-entry for hyperlinking references at equivariant stable homotopy theory and enriched (infinity,1)-category theory
Created page for finitely complete analogue to finitely cocomplete.
clearing this old entry, making “finitely cocomplete” instead a redirect to finitely cocomplete category
adding paper
Added to group object the Yoneda-embedding-style definition and added supergroup to the list of examples.
added to gravity references discussing the covariant phase space of gravity, as part of a reply to this TP.SE-question
added pointer to:
Domenico Fiorenza started a page for the thesis of his student, Alessandra Capotosti: From String structures to Spin structures on loop spaces.
Am I right in thinking the main innovation is the passage from the map
to
Is that likely to work more generally, e.g., can one do something similar with
added to shtuka a pointer to
added to supergravity Lie 6-algebra a brief discussion of how the equations of motion of 11-d supergravity encode precisely the “rheonomic” -connections with values in the supergravity Lie 6-algebra.
Created new page for Paul Olam, which was already dead-linked on non-abelian algebraic topology. Added paper from that page as well as a new paper added on lens spaces.
Added paper now used as reference on lens spaces.
Created page for E. J. Brody and added paper from lens spaces.
I worked on Nonabelian Algebraic Topology
made the entry “category: reference”. all about the book by Brown et al – if we feel we need a more generic entry with lower case title later, we can still split it off again
then I started adding a “Contents” section similar to what we have at Elephant and Higher Topos Theory etc., and started adding some of the content of relevance for the cosmic cube.
Am splitting this off from Weil algebra – for the moment just in order to record some pointers related to the notion called “adjusted Weil algebras” (for -algebras) in
and followups.
I have been editing the entry homotopy equivalence to include a brief discussion of strong homotopy equivalences and Vogt's lemma. In so doing, I have followed my nose and found various other entries to edit. For instance that for Hans Baues, that for cylinder functor, etc. I am thinking that the general area of Henry Whitehead's idea of algebraic homotopy, may be a useful intermediate one between the infinity category ideas (which could be seen as just a 'souped up' version of Kan complexes), (I am not saying they are just that a cynic might make them out to be!) and the algebraic topologists desire to perform calculations. Note the quotes at algebraic homotopy. Of course, they d not say what 'compute' means in this context. (Note we do not have an entry on Whitehead as yet.)
created a minimum at Penrose-Hawking singularity theorem
Created page. Added paper about topological complexity used on real projective space and complex projective space.
For no particular reason, I have added another illustrating graphics to the entry, taken from Fig 1.3 in Apostol 1973.
stub for discrete torsion
A comparatively long and technical section “From hom-functors to units and counits” (on adjoint functors) was sitting inside the Idea-section of adjunction. It seemed plainly misplaced there, and distracting attention from what should be the content of this entry, as opposed to the entry adjoint functor. So I have moved it now to where it seems to belong: inside the Examples-section.
expanded a bit on the Fundamental theorem of Hopf modules, added reference
Added paper about topological complexity used on real projective space and complex projective space.
Created page and added writings about topological complexity.
starting a page meant to be a survey of modern flux quantization (using material from part I of Introduction to Hypothesis H)
So far just some lead-in paragraphs.
Created the page for topological complexity. I will re-check all formulas, conventions and references in the next days.
Created page and added writings about topological complexity.
Added topological complexity of the Klein bottle with reference.
Added a subsection
As a homotopy type
As a homotopy type the torus is the product of two copies of the circle.
In homotopy type theory the torus can be formalized as the higher inductive type generated by a point
base, two paths, and , frombaseto itself, and an element of . It has been formally shown (Sojakova15) that this type is equivalent to the product of two circles. For a treatment in cubical type theory, see (Licata-Brunierie).
conformal block and Vassily Gorbounov. Update at Imma Galvez.
discovered this old & neglected entry while looking to a page on which to record today’s
But clearly, thus page needs more attention.
started an Examples-section at geometric quantization
tried to polish one-point compactification. I think in the process I actually corrected it, too. Please somebody have a close look.
When pointing somebody to it, I noticed that the entry n-category is in a rather sad state and in particular it used to start out in a rather unhelpful fashion. I have now tried to briefly fix at least the latter problem by expanding and editing the first two sentences a bit. Notably I made sure that a pointer to (∞,n)-category appears early on, for that is a place with more robust information, currently.
am starting differential string structure, but not much there yet
added the examples of differential graded-commutative algebras and of differential graded-commutative superalgebras