%0 Journal Article
%A Matsumoto, Yukio
%A Montesinos Amilibia, José María
%T A proof of Thurston's uniformization theorem of geometric orbifolds.
%D 1991
%@ 0387-3870
%U https://hdl.handle.net/20.500.14352/58616
%X The authors prove that every geometric orbifold is good. More precisely, let X be a smooth connected manifold, and let G be a group of diffeomorphisms of X with the property that if any two elements of G agree on a nonempty open subset of X, then they coincide on X. If Q is an orbifold which is locally modelled on quotients of open subsets of X by finite subgroups of G, then the authors prove that the universal orbifold covering of Q is a (G,X)-manifold. A similar theorem was stated, and the proof sketched, in W. Thurston's lecture notes on the geometry and topology of 3-manifolds.
%~