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Given a compact smooth manifold $M$, it's relatively well known that $C^\infty(M)$ determines $M$ up to diffeomorphism. That is, if $M$ and $N$ are two smooth manifolds and there is an $\mathbb{R}$-algebra isomorphism between $C^\infty(M)$ and $C^\infty(N)$, then $M$ and $N$ are diffeomorphic.

(See, for example, Milnor and Stasheff's "Characteristic Classes" book where an exercise walks one through the proof of this fact).

Thus, in some sense, all the information about the manifold is contained in $C^\infty(M)$.

Further, the tools of logic/set theory/model theory etc. have clearly been applied with greater success to purely algebraic structures than to, say, differential or Riemannian geometry. This is partly do the fact that many interesting algebraic structures can be defined via first-order formulas, whereas in the geometric setting, one often uses (needs?) second-order formulas.

So, my question is two-fold:

First, is there a known characterization of when a given (commutive, unital) $\mathbb{R}$-algebra is isomorphic to $C^\infty(M)$ for some compact smooth manifold $M$? I imagine the answer is either known, very difficult, or both.

Second, has anyone applied the machinery of logic/etc to, say, prove an independence result in differential or Riemannian geometry? What are the references?

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  • $\begingroup$ Someone edited this post, and in an effort to see exactly what was changed, I accidentally reverted it to it's current form. For whomever edited it, if you'd like to re-edit, feel free. $\endgroup$ Nov 13, 2009 at 19:09

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There is a very cool answer to your question, and it goes by the name well-adapted models for synthetic differential geometry. Andrew Stacey already indicated it in his reply, but maybe I can expand a bit more on this.

Synthetic differential geometry is an axiom system that characterizes those categories whose objects may sensibly be regarded as spaces on which differential calculus makes sense. These categories are called smooth toposes.

A model for this is a particular such category with these properties. A well-adapted model is one which has a full and faithful embedding of the category of smooth manifolds. (This is "well adapted" from the point of view of ordinary differential geoemtry: ordinary differential geometry embeds into these more powerful theories of smooth structures).

The striking insight is that this perspective in particular usefully unifies the ideas of algebraic geometry with that of differential geoemtry to a grander whole.

Indeed, the category of presheaves on the opposite of (finitely generated) commutative rings is a model for the axioms, and of course this is the context in which algebraic geometry takes place.

But we are entitled to take probe categories considerably richer than just that of duals of commutative rings. In particular, we may consider a category of commutative rings that have a notion of being "smooth" the way a ring of smooth functions is "smooth". These are the C-infinity rings or generalized smooth algebras. Every ring of smooth functions on a smooth manifold is an example, but there are more.

The formal dual of these rings are spaces called smooth loci. This is a smooth analog of the notion of affine scheme. (Notice that the notion of "smooth" as used here is that of differential geometry, not quite that of algebraic geometry, which is more like "singularity free". But they are not unrelated).

The main theorem going in the direction of an answer to your question is that the category of manifolds embeds fully and faithfully into that of smooth loci. See at the link smooth loci for the details.

But inside the category SmoothLoci, manifolds are characterized as the formal dual to their smooth rings of functions, so that's one way to answer your question.

There is a grand story developing from this point on, but for the moment this much is maybe sufficient as a reply.

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    $\begingroup$ Excuse me, is it possible to reformulate the conclusions of this theory for the question that Jason DeVito asked? Which properties distinguish $C^\infty(M)$ among other $\Bbb R$-algebras? $\endgroup$ Apr 11, 2013 at 12:27
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http://www.amazon.com/Smooth-Manifolds-Observables-Jet-Nestruev/dp/0387955437/ref=sr_1_1?ie=UTF8&s=books&qid=1258126939&sr=8-1

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    $\begingroup$ I would also have recommended this book, you may find the answer in it. Moreover you don't need compactness, you can always reconstruct the manifold from its algebra of smooth functions. $\endgroup$ Nov 13, 2009 at 21:54
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Obligatory n-lab reference: generalised smooth algebra. Lots of links to other pages and to other literature, in particular Moerdijk and Reyes' book Models for Smooth Infinitesimal Analysis.

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I'm no expert in this area and can't directly answer your questions, but it seems to me to be related to Connes' non-commutative approach to Riemannian geometry. He considers so-called "spectral triples" which consist of a (certain type of non-commutative) algebra acting on a Hilbert space together with an unbounded operator. One is supposed to think of this as the generalisation of $C^\infty(M)$, $L^2$-integrable spinors and the Dirac operator. The triple must satisfy certain conditions, inspired by the (commutative) manifold case. When the algebra is in fact commutative, I seem to remember that such spectral triples are precisely those arising from a manifold. (Experts: is this right?!)

I think I read about this in "Elements of non-commutative geometry" by but since this isn't really my area I have no idea if this is the best place to start.

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    $\begingroup$ The algebra of a spectral triple being commutative alone does not guarantee yet that it comes from a Riemannian manifold, I think. But it is true that there is a way to characterize Riemannian manifolds in terms of spectral triples. It should be noted that the notion of spectral triple aims at encoding much more than smooth structure: the notion of spectral triple is really an algebraic characterization of Riemannian and (in its graded version) of Spin-structure, hence of metric information on a smooth space. $\endgroup$ Nov 13, 2009 at 15:18
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In certain cases (such as compact complex manifolds) good old fashioned relational approach is sufficient to apply model theory to geometry. One does not need the algebra of functions. You simply name all the submanifolds of your manifold and work with an uncountable language. In this setting not all models are manifolds but you can still prove theorems about manifolds. Here is a survey paper: http://arxiv.org/abs/math/0702468

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