Contents

Definition

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 $C$

• vector spaces,
• affine spaces,
• normed vector spaces,
• inner product spaces,
• Euclidean spaces.

In all these cases, the inclusion $\mathrm{CartSp}\hookrightarrow C$ 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

The corresponding cohesive topos of sheaves is

• ${\mathrm{Sh}}_{(1,1)}({\mathrm{CartSp}}_{\mathrm{smooth}})$, discussed at diffeological space.

• ${\mathrm{Sh}}_{(1,1)}({\mathrm{CartSp}}_{\mathrm{synthdiff}})$, discussed at Cahiers topos.

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

• ${\mathrm{Sh}}_{(\mathrm{\infty },1)}({\mathrm{CartSp}}_{\mathrm{top}})=$ ETop∞Grpd;

• ${\mathrm{Sh}}_{(\mathrm{\infty },1)}({\mathrm{CartSp}}_{\mathrm{smooth}})=$ Smooth∞Grpd;

• ${\mathrm{Sh}}_{(\mathrm{\infty },1)}({\mathrm{CartSp}}_{\mathrm{synthdiff}})=$ SynthDiff∞Grpd;

As a category with open maps

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

As an algebraic theory

The category $\mathrm{CartSp}$ 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, $\mathrm{CartSp}$ 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).

(…)

References

There are various slight variations of the category $\mathrm{CartSp}$ 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 $\mathrm{ThCartSp}$ of infinitesimally thickened Cartesian spaces is known as the site for the Cahiers topos. It is considered

in detal 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)