nLab Vect(X)

Redirected from "VectBund(X)".

Contents

Context

Category theory

Linear algebra

Contents

Definition
Relation to other categories

Vector spaces
Vector bundles over general bases
Higher vector bundles

Definition

For $X$ a suitable space of sorts, the category of vector bundles over $X$ is the category denoted $Vect(X)$ whose

objects are vector bundles over $X$ ,
morphisms are vector bundle homomorphisms over $X$ .

Specifically for $X$ a topological space, there is the category of topological vector bundles over $X$ .

Via direct sum of vector bundles and tensor product of vector bundles this becomes a symmetric monoidal category in two compatible ways, making it a distributive monoidal category, in particular a rig category.

For $X$ a compact Hausdorff space then the Grothendieck group of $Vect(X)$ is the topological K-theory group $K(X)$ .

Relation to other categories

Vector spaces

For $X = \ast$ the point space, then this is equivalently the category Vect of plain vector spaces:

Vect(\ast) \simeq Vect \,.

Vector bundles over general bases

Higher vector bundles

An analog in homotopy theory/higher category theory is the (infinity,1)-category of (infinity,1)-module bundles.

Last revised on November 21, 2022 at 16:34:57. See the history of this page for a list of all contributions to it.