Simultaneous uniformization theorem: Difference between revisions

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Line 1: In mathematics, the '''simultaneous uniformization theorem''', proved by {{harvtxt\|Bers\|1960}}, states that it is possible to simultaneously [[uniformization theorem\|uniformize]] two different [[Riemann surface]]s of the same [[genus (mathematics)\|genus]] using a [[quasi-Fuchsian group]] of the first kind. The quasi-Fuchsian group is essentially uniquely determined by the two Riemann surfaces, so the space of marked quasi-Fuchsian group of the first kind of some fixed genus ''g'' can be identified with the product of two copies of [[Teichmüller space]] of the same genus. Line 9: [[Category:Kleinian groups]] [[Category:Riemann surfaces]] ~~[[Category:Simultaneity]]~~ {{Riemannian-geometry-stub}}