nLab lifts and extensions

Redirected from "lifts and sections".

Contents

Context

Category theory

Idea
Definitions

Extension problem
Retraction problem
Lifting problem
Section problem

Related concepts

Idea

Given any morphism in some category a basic question is to ask for lifts/extensions along it (which are dual notions), and in particular for retracts/sections.

We survey how these concepts relate to each other. See the respective entries for more details and pointers.

Definitions

Extension problem

Given morphisms $i:A\to X$ , $f:A\to Y$ find an extension of $f$ to $X$ , i.e. a morphism $\tilde{f}:X\to Y$ such that $\tilde{f}\circ i=f$ . Notice that if $i:A\hookrightarrow X$ is a subobject, then $\tilde{f}\circ i$ is the restriction $\tilde{f}{|_A}$ , and the condition is $\tilde{f}{|_A} = f$ .

Retraction problem

Let $i:A\to X$ be a morphism. Find a retraction of $i$ , that is a morphism $r:X\to A$ such that $r\circ i = id_A$ .

The retraction problem is a special case of the extension problem for $Y=A$ and $f=id_A$ . Conversely, the general extension problem may (in Top and many other categories) be reduced to a retraction problem:

Proposition (Reducing an extension to a retraction)

If the pushout $Y\coprod_A X$ exists (for $i$ , $f$ as above) then the extensions $\tilde{f}$ of $f$ along $i$ are in 1–1 correspondence with the retractions of $i_*(f) : Y\to Y\coprod_A X$ .

Lifting problem

Given morphisms $p:E\to B$ and $g:Z\to B$ , find a lifting of $g$ to $E$ , i.e. a morphism $\tilde{g}:Z\to E$ such that $p\circ\tilde{g}=g$ .

Section problem

For any $p:E\to B$ find a section $s: B\to E$ , i.e. a morphism $s$ such that $p\circ s = id_B$ .

The section problem is a special case of a lifting problem where $g = id_B : B\to B$ . Then the lifting is the section: $\tilde{g} = s$ . A converse is true in the sense

Proposition (Reducing a lifting to a section)

If the pullback $Z\times_B E$ exists then the general liftings for of $G$ along $p$ as above are in a bijection with the section of $g^*(p)=Z\times_B p : Z\times_B E\to Z$ .

Related concepts

category: disambiguation

Last revised on October 18, 2024 at 07:42:13. See the history of this page for a list of all contributions to it.