vektorikappaleella

Vektorikappaleella, or vector bundle in English, is a fundamental concept in differential geometry and topology. It is a topological space that locally resembles a product of a base space and a fiber. Imagine a surface like a sphere. At each point on the sphere, you can attach a line segment. The collection of all these line segments, arranged in a specific way, forms a vector bundle over the sphere. The sphere is called the base space, and each line segment is a fiber.

More formally, a vector bundle consists of a total space E, a base space B, and a

Vector bundles are essential for many areas of mathematics and physics. For instance, the tangent bundle of