Vector bundle

Definition

A vector bundle over a topological space ${\displaystyle B}$ is a topological space ${\displaystyle E}$ with a bundle map ${\displaystyle p:E\to B}$, along with an open cover ${\displaystyle U_i}$ of ${\displaystyle B}$ such that:

1. For every ${\displaystyle i}$, the projection map from ${\displaystyle p^{-1}(U_i)}$ to ${\displaystyle U_i}$ looks like a coordinate projection from ${\displaystyle U_i\times {\mathbb{R}}^n}$ to ${\displaystyle U_i}$
2. The transition maps between the different coordinatizations are linear in the fiber over every point.