nLab CartSp

Contents

Context

Differential geometry

Higher geometry

Definition
Properties

As a small category of objects with a basis
As a site
As a category with open maps
As an algebraic theory
As a pre-geometry

Related concepts
References

Definition

Write $CartSp$ for the category whose

objects are Cartesian spaces $\mathbb{R}^n$ for $n \in \mathbb{N}$ ;
morphisms are suitable structure-preserving functions between these spaces.

For definiteness we write

$CartSp_{lin}$ for the category whose objects are Cartesian spaces regarded as real vector spaces and whose morphisms are linear functions between these;

$CartSp_{top}$ for the category whose objects are Cartesian spaces regarded as topological spaces equipped with their Euclidean topology and morphisms are continuous maps between them.
$CartSp_{smooth}$ for the category whose objects are Cartesian spaces regarded as smooth manifolds with their standard smooth structure and morphisms are smooth functions.

Properties

As a small category of objects with a basis

A Cartesian space carries a lot of structure, for instance CartSp may be naturally regarded as a full subcategory of the category $C$ , for $C$ (any one of) the category of

In all these cases, the inclusion $CartSp \hookrightarrow C$ is an equivalence of categories: choosing an isomorphism from any of these objects to a Cartesian space amounts to choosing a basis of a vector space, a coordinate system.

As a site

Definition

Write

CartSp ${}_{top}$ for the category whose objects are Cartesian spaces and whose morphisms are all continuous maps between these.
CartSp ${}_{smooth}$ for the category whose objects are Cartesian spaces and whose morphisms are all smooth functions between these.
CartSp ${}_{synthdiff}$ for the full subcategory of the category of smooth loci on those of the form $\mathbb{R}^n \times D$ for $D$ an infinitesimal space (the formal dual of a Weil algebra).

Proposition

In all three cases there is the good open cover coverage that makes CartSp a site.

Proof

For CartSp ${}_{top}$ this is obvious. For CartSp ${}_{smooth}$ this is somewhat more subtle. It is a folk theorem (see the references at open ball). A detailed proof is at good open cover. This directly carries over to $CartSp_{synthdiff}$ .

Proposition

The site $CartSp_{top}$ is a dense subsite of the site of paracompact topological manifolds with the open cover coverage.
The site $CartSp_{smooth}$ is a dense subsite of the site Diff of paracompact smooth manifolds equipped with the open cover coverage.

Proposition

Equipped with this structure of a site, CartSp is an ∞-cohesive site.

The corresponding cohesive topos of sheaves is

$Sh_{(1,1)}(CartSp_{smooth})$ , discussed at diffeological space.
$Sh_{(1,1)}(CartSp_{synthdiff})$ , discussed at Cahiers topos.

The corresponding cohesive (∞,1)-topos of (∞,1)-sheaves is

$Sh_{(\infty,1)}(CartSp_{top}) =$ ETop∞Grpd;
$Sh_{(\infty,1)}(CartSp_{smooth}) =$ Smooth∞Grpd;
$Sh_{(\infty,1)}(CartSp_{synthdiff}) =$ SynthDiff∞Grpd;

Corollary

We have equivalences of categories

$Sh(CartSp_{top}) \simeq Sh(TopMfd)$
$Sh(CartSp_{smooth}) \simeq Sh(Diff)$

and equivalences of (∞,1)-categories

$Sh_{(\infty,1)}(CartSp_{top}) \simeq Sh_{(\infty,1)}(TopMfd)$ ;
$Sh_{(\infty,1)}(CartSp_{smooth}) \simeq Sh_{(\infty,1)}(Diff)$ .

Proof

The first two statements follow by the above proposition with the comparison lemma discussed at dense sub-site.

For the second condition notice that since an ∞-cohesive site is in particular an ∞-local site we have that $Sh_{(\infty,1)}(CartSp)$ is a local (∞,1)-topos. As discussed there, this implies that it is a hypercomplete (∞,1)-topos. By the discussion at model structure on simplicial presheaves this means that it is presented by the Joyal-Jardine-model structure on simplicial sheaves $Sh(CartSp)^{\Delta^{op}}_{loc}$ . The claim then follows with the first two statements.

As a category with open maps

There is a canonical structure of a category with open maps on $CartSp$ (…)

As an algebraic theory

The category $CartSp$ is (the syntactic category of ) a Lawvere theory: the theory for smooth algebras.

As a pre-geometry

Equipped with the above coverage-structure, open map-structure and Lawvere theory-property, $CartSp$ is essentially a pregeometry (for structured (∞,1)-toposes).

(Except that the pullback stability of the open maps holds only in the weaker sense of coverages).

(…)

$\,$

Related concepts

geometries of physics

$\phantom{A}$ (higher) geometry $\phantom{A}$	$\phantom{A}$ site $\phantom{A}$	$\phantom{A}$ sheaf topos $\phantom{A}$	$\phantom{A}$ ∞-sheaf ∞-topos $\phantom{A}$
$\phantom{A}$ discrete geometry $\phantom{A}$	$\phantom{A}$ Point $\phantom{A}$	$\phantom{A}$ Set $\phantom{A}$	$\phantom{A}$ Discrete∞Grpd $\phantom{A}$
$\phantom{A}$ differential geometry $\phantom{A}$	$\phantom{A}$ CartSp $\phantom{A}$	$\phantom{A}$ SmoothSet $\phantom{A}$	$\phantom{A}$ Smooth∞Grpd $\phantom{A}$
$\phantom{A}$ formal geometry $\phantom{A}$	$\phantom{A}$ FormalCartSp $\phantom{A}$	$\phantom{A}$ FormalSmoothSet $\phantom{A}$	$\phantom{A}$ FormalSmooth∞Grpd $\phantom{A}$
$\phantom{A}$ supergeometry $\phantom{A}$	$\phantom{A}$ SuperFormalCartSp $\phantom{A}$	$\phantom{A}$ SuperFormalSmoothSet $\phantom{A}$	$\phantom{A}$ SuperFormalSmooth∞Grpd $\phantom{A}$

$\,$

References

In secton 2 of

R. Blute, J.R.B. Cockett, Robert Seely, Cartesian differential categories, Theory and Applications of Categories, Vol. 22, 2009, No. 23, pp 622-672. (journal, pdf)

$CartSp$ is discussed as an example of a “cartesian differential category”.

There are various slight variations of the category $CartSp$ (many of them equivalent) that one can consider without changing its basic properties as a category of test spaces for generalized smooth spaces. A different choice that enjoys some popularity in the literature is the category of open (contractible) subsets of Euclidean spaces. For more references on this see diffeological space.

The site $CartSp_{synthdiff}$ of infinitesimally thickened Cartesian spaces is known as the site for the Cahiers topos. It is considered in detail in section 5 of

Anders Kock, Convenient vector spaces embed into the Cahiers topos (numdam)

and briefly mentioned in example 2) on p. 191 of

Anders Kock, Synthetic differential geometry (pdf)

following the original article

Eduardo Dubuc, Sur les modeles de la geometrie differentielle synthetique (numdam).

With an eye towards Frölicher spaces the site is also considered in section 5 of

Hirokazu Nishimura, Beyond the Regnant Philosophy of Manifolds (arXiv:0912.0827)

category: category

Last revised on July 18, 2022 at 04:05:52. See the history of this page for a list of all contributions to it.