konformaalsetel

Konformaalsetel refers to conformal mappings in mathematics. A conformal mapping is a function that preserves angles locally. This means that if two curves intersect at a certain angle, their images under a conformal mapping will intersect at the same angle. Conformal mappings are particularly important in complex analysis, where they are functions of a complex variable.

In the context of complex analysis, a function $f(z)$ is conformal at a point $z_0$ if it

These mappings have numerous applications in various fields. They are used in the study of fluid dynamics