nLab delta-functor

Redirected from "∞-functor".
Note: n-functor, n-functor, and delta-functor all redirect for "∞-functor".
Contents

Context

Homological algebra

homological algebra

(also nonabelian homological algebra)

Introduction

Context

Basic definitions

Stable homotopy theory notions

Constructions

Lemmas

diagram chasing

Schanuel's lemma

Homology theories

Theorems

Additive and abelian categories

Contents

Definition

Definition

Let 𝒜\mathcal{A}, \mathcal{B} be two abelian categories.

A homological δ\delta-functor from 𝒜\mathcal{A} to \mathcal{B} is for each nn \in \mathbb{N} a functor

T n:𝒜 T_n : \mathcal{A} \to \mathcal{B}

equipped for each short exact sequence 0ABC00 \to A \to B \to C \to 0 in 𝒜\mathcal{A} with a natural transformation

δ n:T n(C)T n1(A) \delta_n : T_n(C) \to T_{n-1}(A)

such that for each such short exact sequence there is, naturally a long exact sequence

T n+1(C)δT n(A)T n(B)T n(C)δT n1(A). \cdots T_{n+1}(C) \stackrel{\delta}{\to} T_n(A) \to T_n(B) \to T_n(C) \stackrel{\delta }{\to} T_{n-1}(A) \to \cdots \,.

Examples

The archetypical example is the chain homology functor

H ():Ch (𝒜)𝒜 H_\bullet(-) : Ch_\bullet(\mathcal{A}) \to \mathcal{A}

from the category of chain complexes of some abelian category (for \mathbb{N}-graded complexes).

The universal example are (non-total) right derived functors.

References

The notion is due to

A textbook account is for instance section 2.1 of

Last revised on September 30, 2017 at 00:00:16. See the history of this page for a list of all contributions to it.