synthetic differential geometry
Introductions
from point-set topology to differentiable manifolds
geometry of physics: coordinate systems, smooth spaces, manifolds, smooth homotopy types, supergeometry
Differentials
Tangency
The magic algebraic facts
Theorems
Axiomatics
Models
differential equations, variational calculus
Chern-Weil theory, ∞-Chern-Weil theory
Cartan geometry (super, higher)
The functor which sends
smooth manifolds to their algebras of smooth functions with values in the real numbers, regarded just as -algebras (instead of, say smooth algebras aka “-rings”),
smooth functions between these manifolds to the corresponding pullback/precomposition algebra homomorphisms between these function algebras
turns out to be fully faithful, hence a full subcategory embedding of SmthMfd into the opposite of .
This is remarkable, because such a relation between spaces and their plain algebras of functions is (more) manifest only for affine varieties in algebraic geometry, where however it holds essentially by construction. In contrast, nothing in the usual definition of smooth manifolds manifestly suggests that they behave to some extent similarly to affine varieties with respect to -algebras of smooth functions. (See also at duality between algebra and geometry.)
Related “miracles” in differential geometry, revealing a maybe surprising algebro-geometric-nature, are the facts that:
Kähler C^∞-differentials of smooth functions are differential 1-forms,
smooth differential forms form the free C^∞-DGA on smooth functions
finitely generated projective modules over smooth functions are smooth vector bundles.
Accordingly, the embedding of smooth manifolds into formal duals of -algebras allows to import some constructions and tools from algebraic geometry into differential geometry without strengthening the notion of “algebra” to something like smooth algebras.
This is useful and is used particularly for discussions in synthetic differential geometry — cf. e.g. the emphasis on “Weil algebras”, hence of would-be function algebras on infinitesimally thickened points, in Kolář, Michor & Slovák 1993 §35.
(Pursell, Section 8, 1952)
For a smooth manifold , the evaluation map (from its underlying set to the hom-set)
is a bijection.
The statement also appears in Milnor & Stasheff (1974) Prob. 1-C (p. 11) and a detailed proof different from the one below is given by Kolář, Michor & Slovák 1993 Lem. 35.8 & Cor. 35.9.
We provide a simplified proof using Hadamard's lemma. Suppose is a smooth manifold and is a homomorphism of real algebras.
If for some , then set , where is the th coordinate function. We have
where the functions are provided by Hadamard's lemma.
For a general , use Whitney's embedding theorem to embed into some . Without loss of generality we can assume the embedding to be proper so that the subset is closed.
Consider the composition
where the first homomorphism is given by restricting along the embedding. The composition is given by evaluating at some point .
If , we can construct a smooth function that vanishes on and does not vanish at . For example, we can take the smooth function with zero locus constructed by the smooth Tietze extension theorem, or simply use smooth bump functions. The function vanishes on and therefore belongs to the kernel of the map . The evaluation homomorphism at does not vanish on the element , hence cannot factor through the map , a contradiction. Therefore, we must have .
Pursell’s theorem (Lemma ) implies — and also is the special case for (the point) of:
The functor
which sends a smooth manifold (finite dimensional, paracompact, second countable) to (the formal dual of) its -algebra of smooth functions, , is a full and faithful functor.
In other words, given a pair of smooth manifolds then the operation of precomposition (pullback of functions) constitutes a natural bijection
between
the smooth functions ,
the -algebra homomorphisms .
In particular, the diffeomorphisms between smooth manifolds are in natural bijection to the isomorphisms between their algebras of functions.
It is clear that the functor is faithful; we need to show that it is full, hence that for any -algebra homomorphism
there exists a smooth function such that .
To that end, observe that given a point , the postcomposition of with the evaluation map at
is an algebra homomorphism of the form assumed in Pursell’s theorem (Lemma ) and thus given uniquely by evaluation at some point
This implies that acts on any by
hence that it acts by precomposition with the assignment :
It just remains to observe that this is necessarily smooth. But since is given on all this way, to see that is smooth at some , choose any coordinate chart around and consider a which restricts to one of the coordinate functions on . Then is the th coordinate component of restricted to a neighbourhood of , and this being smooth for all means that is smooth around .
(attribution)
For the case of diffeomorphisms, Thm. was proven by Pursell (1952), following an announcement by Shanks (1951). This is the case that most reviews focus on, e.g. Grabowski (1978), Marsden, Ratiu & Abraham (2002), Grabowski (2005).
For the case that the domain is a point the statement is contained in the dissertation of Pursell (Section 8), see Lemma . It is also left as an exercise (without reference to Pursell) in Milnor & Stasheff (1974) §1, Problem 1-C (p. 11), sometimes now referred to (not entirely appropriately) as “Milnor’s exercise”, even though Pursell’s proof was published 22 years prior in 1952. A detailed proof is also given in Kolář, Slovák & Michor (1993) 35.8-9.
The general statement of Theorem appears as Kolář, Slovák & Michor (1993) 35.10.
The statement of theorem serves as the stepping-stone for generalizations of differential geometry such as to supergeometry. On the other hand, for transporting various applications familiar from algebraic geometry to differential geometry (such as Kähler differentials, see there) the above embedding is insufficient, and instead of just remembering the associative algebra structure, one needs to remember the smooth algebra-structure on algebras of smooth functions. See also at synthetic differential geometry.
If one drops standard regularity assumptions on manifolds then theorem may break. For instance allowing uncountably many connected components, then there are counterexamples (MO discussion).
The analogous statement in topology is:
duality between algebra and geometry
in physics:
The case of the category of smooth manifolds with (just) diffeomorphisms between them is proved in
following an announcement in
See also
Janez Mrčun, On isomorphisms of algebras of smooth functions, Proceedings of the American Mathematical Society 133:10 (2005), 3109-3113. arXiv, doi.
J. Grabowski, Isomorphisms of algebras of smooth functions revisited. Arch. Math. 85, 190–196 (2005). arXiv, doi.
The statement for domain a point also appears as an exercise in
A proof is spelled out in
Eduardo Dubuc, Prop. 0.7 in: Sur les modèles de la géométrie différentielle synthétique, Cahiers de Topologie et Géométrie Différentielle Catégoriques 20 3 (1979) 231-279 [numdam:CTGDC_1979__20_3_231_0]
(in defining the Cahiers topos)
Expository accounts for the case of isomorphisms are in
Janusz Grabowski, Isomorphisms and ideals of the Lie algebras of vector fields, Inventiones mathematicae volume 50, pages 13–33 (1978) (doi:10.1007/BF01406466)
Jerrold Marsden, J. Ratiu, R. Abraham, Theorem 4.2.36 in: Manifolds, tensor analysis, and applications, Springer 2003 (ISBN:978-1-4612-1029-0)
Janusz Grabowski, Isomorphisms of algebras of smooth functions revisited, Arch. Math. 85 (2005), 190-196 (arXiv:math/0310295)
The general statement and its proof is discussed in:
Discussion that takes the dual algebraic formulation as the very definition of smooth functions is in
The analog of the statement for real algebras refined to smooth algebras is Theorem 2.8 in
Last revised on November 29, 2024 at 05:26:18. See the history of this page for a list of all contributions to it.