Talk:Uniformization theorem

Gauss-Bonnet
Add a reference to the Gauss-Bonnet theorem, which determines the sign of the curvature when the surface is of finite type.

--Mosher 14:34, 21 September 2005 (UTC)

Almost-all
Why does it say "almost all" surfaces are hyperbolic? This only makes sense if you have a measure on the space of "all" surfaces. We haven't talked about such a measure. So unless someone objects some time soon I'm going to delete that.

--sigfpe 8 Feb 2006


 * There are infinitely many (homeomorphism classes of) surfaces. Only finitely many of these do not admit a hyperbolic structure.  So deleting "almost all" would be a mistake.  Replacing "almost all" by "all but finitely many" might be more accurate, I suppose... Sam nead 16:32, 1 March 2006 (UTC)


 * Ah. You mean "almost all" in this sense :-) Sigfpe 23:48, 24 March 2006 (UTC)


 * See Teichmuller space for a sense of size.

Needs clarification
I think there's a lot that needs to be clarified here. "The uniformization theorem" means a few different things, depending on context. It's not at all clear that the statements, "Every surface has a geometric structure," and "Every simply connected Riemann surface is either S2, the complex plane, or the upper half plane," are equivalent, and the article kind of talks about all these facts at once. For one, the fact that the conformal automorphism group of H is exactly the same as the hyperbolic isometry group is nontrivial. The fact that the universal cover of a constant curvature manifold is the same, with isometric covering translations, is worth mentioning. I think the relationship between complex structures, conformal classes, and constant curvature metrics should really be explained well for this article.67.169.47.149 (talk) 08:05, 31 January 2009 (UTC)

classifications
in this article there are two different classifications:

under Uniformization theorem it is : the Riemann sphere, the complex plane, the unit disk in the complex plane.

and under Uniformization theorem it is the sphere (curvature +1), the Euclidean plane (curvature 0), the hyperbolic plane (curvature −1).

I am wondering how are these classifications related and secondly why is the " unit disk in the complex plane" special, you can just map it to the (complete) complex plane vv. WillemienH (talk) 08:47, 29 April 2015 (UTC)

French page
The French page to this article seems to be this one rather than the one already linked. Could any please change it? Thanks. — Preceding unsigned comment added by Nadya Inoubli (talk • contribs) 22:56, 8 June 2015 (UTC)