Want to take part in these discussions? Sign in if you have an account, or apply for one below
Vanilla 1.1.10 is a product of Lussumo. More Information: Documentation, Community Support.
added publication data for these two items:
Rui Loja Fernandes, Marius Crainic, Integrability of Lie brackets, Ann. of Math. 157 2 (2003) 575-620 [arXiv:math.DG/0105033, doi:10.4007/annals.2003.157.575]
Rui Loja Fernandes, Marius Crainic, Lectures on Integrability of Lie Brackets, Geometry & Topology Monographs 17 (2011) 1–107 [arxiv:math.DG/0611259, doi:10.2140/gtm.2011.17.1]
have created enriched bicategory in order to help Alex find the appropriate page for his notes.
Edit to: standard model of particle physics by Urs Schreiber at 2018-04-01 01:15:37 UTC.
Author comments:
added textbook reference
Created:
The correct notion of a Kähler differential for C^∞-rings
See the article Kähler C^∞-differentials of smooth functions are differential 1-forms for motivation and definition and the article smooth differential forms form the free C^∞-DGA on smooth functions for further developments and applications like the Poincaré lemma.
Created:
The correct notion of a derivation for C^∞-rings
See the article Kähler C^∞-differentials of smooth functions are differential 1-forms for motivation and definition and the article smooth differential forms form the free C^∞-DGA on smooth functions for further developments and applications like the Poincaré lemma.
Created:
See the article Kähler C^∞-differentials of smooth functions are differential 1-forms for the necessary background for this article, including the notions of C^∞-ring, C^∞-derivation, and Kähler C^∞-differential.
In algebraic geometry, (algebraic) differential forms on the Zariski spectrum of a [commutative ring (or a commutative -algebra ) can be defined as the free commutative differential graded algebra on .
This definition does not quite work for smooth manifolds: as already explained in the article Kähler C^∞-differentials of smooth functions are differential 1-forms, the notion of a Kähler differential must be refined in order to extract smooth differential 1-forms from the C^∞-ring of smooth functions on a smooth manifold .
Thus, in order to get the algebra of smooth differential forms, the notion of a commutative differential graded algebra must likewise be adjusted.
\begin{definition} A commutative differential graded C^∞-ring is a real commutative differential graded algebra whose degree 0 component is equipped with a structure of a C^∞-ring in such a way that the degree 0 differential is a C^∞-derivation. \end{definition}
With this definition, we can recover smooth differential forms in a manner similar to algebraic geometry, deducing the following consequence of the Dubuc–Kock theorem for Kähler C^∞-differentials.
\begin{theorem} The free commutative differential graded C^∞-ring on the C^∞-ring of smooth functions on a smooth manifold is canonically isomorphic to the differential graded algebra of smooth differential forms on . \end{theorem}
The Poincaré lemma becomes a trivial consequence of the above theorem.
\begin{proposition} For every , the canonical map
is a quasi-isomorphism of differential graded algebras. \end{proposition}
\begin{proof} (Copied from the MathOverflow answer.) The de Rham complex of a finite-dimensional smooth manifold is the free C^∞-dg-ring on the C^∞-ring . If is the underlying smooth manifold of a finite-dimensional real vector space , then is the free C^∞-ring on the vector space (the real dual of ). Thus, the de Rham complex of a finite-dimensional real vector space is the free C^∞-dg-ring on the vector space . This free C^∞-dg-ring is the free C^∞-dg-ring on the free cochain complex on the vector space . The latter cochain complex is simply with the identity differential. It is cochain homotopy equivalent to the zero cochain complex, and the free functor from cochain complexes to C^∞-dg-rings preserves cochain homotopy equivalences. Thus, the de Rham complex of the smooth manifold is cochain homotopy equivalent to the free C^∞-dg-ring on the zero cochain complex, i.e., in degree 0. \end{proof}
gave this reference item some more hyperlinks:
Created:
In algebraic geometry, the module of Kähler differentials of a commutative ring corresponds under the Serre–Swan duality to the cotangent bundle of the Zariski spectrum of .
In contrast, the module of Kähler differentials of the commutative real algebra of smooth functions on a smooth manifold receives a canonical map from the module of smooth sections of the cotangent bundle of that is quite far from being an isomorphism.
An example illustrating this point is , since in the module of (traditionally defined) Kähler differentials of we have , where is the exponential function. That is to say, the traditional algebraic notion of a Kähler differential is unable to deduce that using the Leibniz rule.
However, this is not a defect in the conceptual idea itself, but merely a failure to use the correct formalism. The appropriate notion of a ring in the context of differential geometry is not merely a commutative real algebra, but a more refined structure, namely, a C^∞-ring.
This notion comes with its own variant of commutative algebra. Some of the resulting concepts turn out to be exactly the same as in the traditional case. For example, ideals of C^∞-rings and modules over C^∞-rings happen to coincide with ideals and modules in the traditional sense. Others, like derivations, must be defined carefully, and definitions that used to be equivalent in the traditional algebraic context need not remain so in the context of C^∞-rings.
Observe that a map of sets (where is an -module) is a derivation if and only if for any real polynomial the chain rule holds:
Indeed, taking and recovers the additivity and Leibniz property of derivations, respectively.
Observe also that is an element of the free commutative real algebra on elements, i.e., .
If we now substitute C^∞-rings for commutative real algebras, we arrive at the correct notion of a derivation for C^∞-rings:
A __C^∞-derivation__ of a [[C^∞-ring]] $A$ is a map of sets $A\to M$ (where $M$ is a [[module]] over $A$) such that the following chain rule holds for every smooth function $f\in\mathrm{C}^\infty(\mathbf{R}^n)$:
$$d(f(a_1,\ldots,a_n))=\sum_i {\partial f\over\partial x_i}(x_1,\ldots,x_n) dx_i,$$
where both sides use the structure of a [[C^∞-ring]] to evaluate a smooth real function on a collection of elements in $A$.
The module of Kähler C^∞-differentials can now be defined in the same manner as ordinary Kähler differentials, using C^∞-derivations instead of ordinary derivations.
\begin{theorem} (Dubuc, Kock, 1984.) The module of Kähler C^∞-differentials of the C^∞-ring of smooth functions on a smooth manifold is canonically isomorphic to the module of sections of the cotangent bundle of . \end{theorem}
I strongly disagree with the statement in Grothendieck category that the Grothendieck category is small. The main examples like are not! What did the writer of that line have in mind ?
I added to the “abstract nonsense” section in free monoid a helpful general observation on how to construct free monoids. “Adjoint functor theorem” is overkill for free monoids over .
added at Grothendieck universe at References a pointer to the proof that these are sets of -small sets for inaccessible . (also at inaccessible cardinal)
The entry lax morphism classifier was started two yeats ago, is actually empty!
I have created lax morphism, with general definitions and a list of examples. It would be great to have more examples.
Added related concepts section with links to coherent category, coherent hyperdoctrine, Pos, and Frm
Anonymouse
Added table of contents and links to geometric category and geometric hyperdoctrine
Anonymouse
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.
At overt space there was a remark that since the definition quantifies over “spaces”, the overtness of a single space might depend on the general meaning chosen for “space”, but that no example was known to the author. I added an example involving synthetic topology, which may not be quite what the author of that remark was thinking of, but which I think is interesting.
I incorporated some of my spiel from the blog into the page type theory.
There has GOT to be a better photograph than that! Is there anyone here in Oxford? Can they go and get a picture for us?
the table didn’t have the basic examples, such as Gelfand duality and Milnor’s exercise. Added now.
I made some very minor changes to the introduction at descent. I hesitate to do more but at present the discussion does not seem that readable to me. Can someone look at it to see what they think? The intro seems to plunge in deep very quickly and so the ‘idea’ of descent as that of gluing local information together, does not come across to me. The article is lso quite long and perhaps needs splitting up a bit.
Added some content to display map from Taylor’s book. Not very deep, mostly as a reference to the respective section for me.
I added to category of elements an argument for why preserves colimits.
Created basic outline with some important connections. Yang-Mills measure, after all the main concept which makes this special case interesting, and references will be added later.
Edit: Crosslinked D=2 Yang-Mills theory on related pages: D=2 QCD, D=4 Yang-Mills theory, D=5 Yang-Mills theory.
(Today’s arXiv) A homotopification
and few more additions.
I added the HoTT introduction rule for ’the’, then added a speculative remark on why say things like
The Duck-billed Platypus is a primitive mammal that lives in Australia.
tried to bring the entry Lie group a bit into shape: added plenty of sections and cross links to other nLab material. But there is still much that deserves to be done.
Created:
An internal category object in the category of smooth manifolds in which the source and target maps are submersions.
Sometimes, the smooth manifold of morphisms is allowed to have a boundary, in which case the restrictions of the source and target maps to the boundary are required to be submersions themselves.
i have split off (copied over) the paragraph on the first uncountable ordinal from countable ordinal to first uncountable ordinal, just in order to make it possible to link to “first uncountable ordinal” more directly. Cross-linked with long line.
brief category:people-entry for hyperlinking references at skyrmion, atomic nucleus