differentiaaligeometrisiä

Differentiaaligeometrisiä refers to a collection of mathematical concepts and tools used to study geometric properties of curves, surfaces, and more general manifolds. At its core, it involves using calculus, particularly differentiation and integration, to understand the local and global properties of these geometric objects.

Key ideas within differentiaaligeometrisiä include the study of curvature, which quantifies how much a curve or

The theory of connections is also central, enabling the definition of parallel transport, which allows vectors