Banach bundle (non-commutative geometry)

Let ${\displaystyle X}$  be a topological Hausdorff space, a (continuous) Banach bundle over ${\displaystyle X}$  is a tuple ${\displaystyle {\mathfrak {B}}=(B,\pi )}$ , where ${\displaystyle B}$  is a topological Hausdorff space, and ${\displaystyle \pi \colon B\to X}$  is a continuous, open surjection, such that each fiber ${\displaystyle B_{x}:=\pi ^{-1}(x)}$  is a Banach space. Which satisfies the following conditions:

1. The map ${\displaystyle b\mapsto \|b\|}$  is continuous for all ${\displaystyle b\in B}$ 
2. The operation ${\displaystyle +\colon \{(b_{1},b_{2})\in B\times B:\pi (b_{1})=\pi (b_{2})\}\to B}$  is continuous
3. For every ${\displaystyle \lambda \in \mathbb {C} }$ , the map ${\displaystyle b\mapsto \lambda \cdot b}$  is continuous
4. If ${\displaystyle x\in X}$ , and ${\displaystyle \{b_{i}\}}$  is a net in ${\displaystyle B}$ , such that ${\displaystyle \|b_{i}\|\to 0}$  and ${\displaystyle \pi (b_{i})\to x}$ , then ${\displaystyle b_{i}\to 0_{x}\in B}$ , where ${\displaystyle 0_{x}}$  denotes the zero of the fiber ${\displaystyle B_{x}}$ .^[1]

If the map ${\displaystyle b\mapsto \|b\|}$  is only upper semi-continuous, ${\displaystyle {\mathfrak {B}}}$  is called upper semi-continuous bundle.

Let A be a Banach space, X be a topological Hausdorff space. Define ${\displaystyle B:=A\times X}$  and ${\displaystyle \pi \colon B\to X}$  by ${\displaystyle \pi (a,x):=x}$ . Then ${\displaystyle (B,\pi )}$  is a Banach bundle, called the trivial bundle

• Banach bundles in differential geometry