Riemann sphere

Complex structure

The complex manifold structure on the Riemann sphere is specified by an atlas with two charts as follows

The Riemann sphere has the same topology as S², that is, the sphere of radius 1 centered at the origin in the Euclidean space R³. A homeomorphism between them is given by the stereographic projection tangent to the South Pole onto the complex plane. Labeling the points in S² by (x₁, x₂, x₃) where , the homeomorphism is

In terms of standard spherical coordinates (θ, φ), this map can be given as
:

One can also use the stereographic projection tangent to the
North Pole, which will map the North Pole to the origin and the South Pole to ∞. The formula is

or, in spherical coordinates
:

The complex projective line

Properties

In the category of Riemann surfaces, the automorphism group of the Riemann sphere is the group of Möbius transformations. These are just the projective linear transformations PGL₂ C on CP¹. When the sphere is given the round metric the isometry group is the subgroup PSU₂ C (which is isomorphic to rotation group SO(3)).

The Riemann sphere is one of three simply-connected Riemann surfaces. The other two being the complex plane and the hyperbolic plane. This statement, known as the uniformization theorem, is important to the classification of Riemann surfaces.

See also

• projective geometry
• complex projective space
• conformal geometry
• cross-ratio
• meromorphic function
• Hopf bundle
• Dessin d'enfant