Axiomatics

Models

Models for Smooth Infinitesimal Analysis
- Fermat theory
- smooth algebra (C-∞-ring)
- smooth loci
- smooth natural numbers

Variations

Edit this sidebar

objects

$d \in C$
such that
$C (d, -)$
commutes with certain colimits

Edit this sidebar

Contents
Definition
right adjoints to representable exponentials
References

Definition

Bill Lawvere’s definition of an atomic infinitesimal space is as an object $Δ$ in a topos $𝒯$ such that the inner hom functor $(-)^{Δ} : 𝒯 \to 𝒯$ has a right adjoint.

Notice that by definition of inner hom, $(-)^{Δ}$ always has a left adjoint. A right adjoint can only exist for very particular objects. Therefore the term amazing right adjoint

right adjoints to representable exponentials

Assume $𝒯 = Sh (C)$ is a Grothendieck topos, that the Grothendieck topology on the site $C$ is subcanonical. Let $Δ \in C ↪ Sh (C)$ be a representable object.

Then $(-)^{Δ}$ has a right adjoint, hence $Δ$ is an atomic infinitesimal space, precisely if it preserves colimits.

For if $(-)^{Δ}$ preserves colimits, its right adjoint is

(-)_{Δ} : (Y \in Sh (C)) \mapsto (U \mapsto {Sh}_{C} (U^{Δ}, Y)) .

The $Y_{Δ}$ defined this way is indeed a sheaf, due to the assumption that $(-)^{Δ}$ preserves colimits. So this is indeed a right adjoint.

References

appendix 4 of

Ieke Moerdijk, Gonzalo Reyes, Models for Smooth Infinitesimal Analysis

nLab amazing right adjoint