nLab (0,1)-topos

Redirected from "0-topos".

Contents

Context

$(0,1)$ -Category theory

Topos Theory

Idea
Related concepts
References

Idea

The notion of $(0,1)$ -topos is that of topos in the context of (0,1)-category theory.

The notion of $(0,1)$ -topos is essentially equivalent to that of Heyting algebra; similarly, a Grothendieck $(0,1)$ -topos is a locale.

Notice that every $(1,1)$ -Grothendieck topos comes from a localic groupoid, i.e. a groupoid internal to locales, hence a groupoid internal to $(0,1)$ -toposes. See classifying topos of a localic groupoid for more.

Related concepts

flavors of higher toposes

1-topos
- (0,1)-topos
- (1,1)-topos = topos
- (2,1)-topos
- $(n,1)$ -topos
- (∞,1)-topos ( $n$ -localic)
  
  $\;\;\;\;$ model topos
2-topos
- (2,2)-topos ( $n$ -localic)
- (∞,2)-topos
$n$ -topos
- $(\infty,n)$ -topos

References

J. C. Baez, M. Shulman, Lectures on n-categories and cohomology , pp.1-68 in J. C. Baez, P. May (eds.), Towards Higher Categories, Springer Heidelberg 2010. (preprint; section 5.3)
Jacob Lurie, Higher Topos Theory , Princeton UP 2009. (section 6.4.2)

Last revised on August 25, 2021 at 15:40:29. See the history of this page for a list of all contributions to it.

nLab (0,1)-topos

Context

$(0,1)$ -Category theory

Theorems

Topos Theory

Background

Toposes

Internal Logic

Topos morphisms

Extra stuff, structure, properties

Cohomology and homotopy

In higher category theory

Theorems

Contents

Idea

Related concepts

References

nLab (0,1)-topos

Context

(0,1)(0,1)-Category theory

Theorems

Topos Theory

Background

Toposes

Internal Logic

Topos morphisms

Extra stuff, structure, properties

Cohomology and homotopy

In higher category theory

Theorems

Contents

Idea

Related concepts

References

$(0,1)$ -Category theory