nLab pointed model category

Redirected from "pointed model categories".

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Definition

A model category is pointed if its underlying category is a pointed category, i.e., if the unique morphism from the initial object to the terminal object is an isomorphism, in which case both of them are denoted by $0$ (the zero object).

In any pointed category, one has a canonical zero morphism between any pair of objects $A$ and $B$ , given by the composition $A\to 0\to B$ .

The homotopy equalizer of $f\colon A\to B$ and $0\colon A\to B$ is known as the homotopy fiber of $f$ .

The homotopy coequalizer of $f\colon A\to B$ and $0\colon A\to B$ is known as the homotopy cofiber of $f$ .

In particuar there is the homotopy (co)-fiber of the zero object with itself, the loop space object- and reduced suspension-operation. Asking these operations to be equivalences in a suitable sense leads to the concept of linear model categories and stable model categories.

Model categories which are pointed without being linear or even stable:

Pointed model categories which are stable:

Last revised on October 1, 2021 at 08:33:27. See the history of this page for a list of all contributions to it.