holomorfisuus

Holomorfisuus is a fundamental concept in complex analysis, describing functions that are differentiable in a complex sense. A complex-valued function f(z) of a complex variable z is said to be holomorphic in an open set U of the complex plane if it is complex differentiable at every point in U. Complex differentiability is defined similarly to real differentiability, but with the limit taken as the change in z approaches zero along any path in the complex plane. This is a much stronger condition than real differentiability.

The Cauchy-Riemann equations provide a necessary and sufficient condition for a function to be holomorphic. If

Holomorphic functions possess many remarkable properties not shared by their real-valued counterparts. For instance, any holomorphic