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added pointer to today’s
for hyperlinking references at supersymmetry snd division algebras
I have added some things to frame. Mostly duplicating things said elsewhere (at locale and at (0,1)-topos), but I need these statements to be at frame itself.
started a bare minimum at Poisson-Lie T-duality, for the moment just so as to have a place to record the two original references
added to transferred model structure a simple remark in a subsection Enrichement on conditions that allow to transfer also an enriched model structure.
(The example I am thinking of is transferring the sSet-enriched model structure on cosimplicial rings to one on cosimplicial smooth algebras. But I won’t type that into the entry for the moment…)
brief category:people-entry for hyperlinking references at CR-manifold
discovered this old but empty entry. Made it point to CR-manifold
(it might just be cleared and “CR-structure” made a redirect for “CR-manifold”)
I have added to algebra for an endofunctor a remark on the relation to algebras over free monads. While I think that’s pretty obvious, I notice that a) recently somebody has blogged about that here, b) here it says that it’s not true :-) (but I think it’s not meant to be read that way).
brief category:people-entry for hyperlinking references at conformal geometry
added pointer to
for discussion of conformal structure as G-structure
quick note at spin structure on the characterization over Kähler manifolds
Expanded dinatural transformation a little with examples and references.
Hello,
I noticed DFT page has not been updated in a while and I added a couple of sections: some sketchy introductory material (analogy between Kaluza-Klein and DFT) and a little insight about a more rigorous geometrical formulation of DFT.
It is still quite sketchy but I would be happy to refine it.
PS: this is my first edit, I hope I played by the rules. And thank you all for this wiki
Luigi
added publication data to
and pointer to section 11.1 there for Kaehler structures as torsion-free -structures
added this statement:
Let be a closed smooth manifold of dimension 8 with Spin structure. If the frame bundle moreover admits G-structure for
then the Euler class , the second Pontryagin class and the cup product-square of the first Pontryagin class of the frame bundle/tangent bundle are related by
I added a comment on the Calabi-Yau variety page about . Does anyone know if it’s still true in the non-compact case?
Also, what’s the proper way to add questions/parenthetical remarks to n-Lab pages?
stub for special holonomy, just to record two references for the moment.
Also added a line to the Idea-section at holonomy that mentions holonomy group and special holonomy.
I have expanded symplectic manifold a little
brief category:people-entry for hyperlinking references at Sp(n).Sp(1), at quaternionic manifold and at quaternion-Kähler manifold
added pointer to
have added pointer to
Charles Rezk, A model for the homotopy theory of homotopy theory, Trans. Amer. Math. Soc. 353 (2001), 973-1007 (arXiv:math/9811037, doi:10.1090/S0002-9947-00-02653-2)
Julia Bergner, Three models for the homotopy theory of homotopy theories, Topology Volume 46, Issue 4, September 2007, Pages 397-436 (arXiv:math/0504334, doi:10.1016/j.top.2007.03.002)