nLab
accessible functor

Context

Category theory

Compact objects

Definition
- For categories
Related concepts
References

Definition

For categories

F\colon C\to D

is a $\kappa$ -accessible functor (for $\kappa$ a regular cardinal) if $C$ and $D$ are both $\kappa$ -accessible categories and $F$ preserves $\kappa$ -filtered colimits. $F$ is an accessible functor if it is $\kappa$ -accessible for some regular cardinal $\kappa$ .

Related concepts

References

The theory of accessible 1-categories is described in

Michael Makkai, Robert Paré, Accessible categories: The foundations of categorical model theory Contemporary Mathematics 104. American Mathematical Society, Rhode Island, 1989.1989.

Ji?í Adámek?, Ji?í Rosický?, Locally presentable and accessible categories, Cambridge University Press, (1994)

The theory of accessible $(\infty,1)$ -categories is the topic of section 5.4 of

Jacob Lurie, Higher Topos Theory

Last revised on January 5, 2014 at 09:03:03. See the history of this page for a list of all contributions to it.

nLab
accessible functor

Context

Category theory

Concepts

Universal constructions

Theorems

Extensions

Applications

Compact objects

Models

Relative version

Contents

Definition

For categories

Related concepts

References

nLab accessible functor

Context

Category theory

Concepts

Universal constructions

Theorems

Extensions

Applications

Compact objects

Models

Relative version

Contents

Definition

For categories

Related concepts

References

nLab
accessible functor