parallelltransport

Parallelltransport is a concept in differential geometry that describes how to move a vector along a curve in a differentiable manifold. It is a way to compare vectors at different points on the manifold by "transporting" them in a way that preserves their directional properties relative to the manifold's structure. Imagine having a vector at one point on a curved surface. Parallelltransport allows you to define a corresponding vector at another point on that surface, ensuring that it remains "parallel" to the original vector in the context of the surface's curvature.

The process of parallelltransport is defined using a connection, which is a mathematical tool that specifies

In essence, parallelltransport provides a way to define a "straight line" or geodesic path on a curved