Upper half-plane

This article defines a particular simply connected domain in

${\displaystyle \mathbb{C}}$

, the complex numbers
View a complete list of particular simply connected domains

Definition

The upper half-plane is defined as the set of complex numbers with strictly positive imaginary part, i.e.:

${\displaystyle \mathcal{H}}:=\{x+iy\mid y>0\}$

Riemann mapping

The upper half-plane admits a particularly easy Riemann mapping; in fact, one coming from a fractional linear transformation:

${\displaystyle z\mapsto \frac{z-i}{z+i}}$

Relation with other domains

• [{Right half-plane]]: The right half-plane maps bijectively to the upper half-plane via a rotation map ${\displaystyle z\mapsto iz}$
• Slit plane: The slit plane maps bijectively to the upper half-plane via the map ${\displaystyle z\mapsto i\sqrt{z}}$