nLab category with translation

Category with translation

Context

Homological algebra

Stable homotopy theory

Category with translation

Idea
Definition
Examples
Related concepts

Idea

A category with translations is a category equipped with a rudimentary notion of suspension objects. Categories with translation underlie triangulated categories where the “translation” becomes a genuine suspension as in homotopy fiber sequences.

Definition

A category with translation is a category $C$ equipped with an auto-equivalence functor

T : C \to C

called the shift functor or translation functor or suspension functor.

Remark

Frequently $C$ is an additive category in which case $T$ is also required to be an additive functor.

Definition

A morphism of categories with translation $F:(C,T)\to (C',T')$ is a functor $F:C\to C'$ equipped with an isomorphism $F\circ T\cong T'\circ F$ :

\array{ C &\stackrel{F}{\to}& C' \\ \downarrow^T &\swArrow^{\simeq}& \downarrow^{T'} \\ C &\stackrel{F}{\to}& C' } \,.

If $C$ , $C'$ are additive and $F$ is additive $F$ is a “morphism of additive categories with translation”.

Definition

In any additive category with translation a triangle is a sequence of morphisms of the form

a\stackrel{f}\to b\stackrel{g}\to c\stackrel{h}\to T a \,.

Remark

In some variants the translation endofunctor $T$ is not required to be an equivalence. This is the case for instance for the presuspended categories of Keller and Vossieck.

Examples

The “translation” functor models the shift operation in a triangulated category, where one chooses a distinguished collection of triangles satisfying some axioms.

Related concepts

Last revised on April 15, 2015 at 23:00:32. See the history of this page for a list of all contributions to it.

nLab category with translation

Context

Homological algebra

Stable homotopy theory

Ingredients

Contents

Category with translation

Idea

Definition

Definition

Remark

Definition

Definition

Remark

Examples

Related concepts