Simultaneous uniformization theorem
In mathematics, the simultaneous uniformization theorem, proved by {{harvtxt|Bers|1960}}, states that it is possible to simultaneously uniformize two different Riemann surfaces of the same 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.
References
- {{Citation | last1=Bers | first1=Lipman |authorlink=Lipman Bers| title=Simultaneous uniformization | doi=10.1090/S0002-9904-1960-10413-2 | mr=0111834 | year=1960 | journal=Bulletin of the American Mathematical Society | issn=0002-9904 | volume=66 | issue=2 | pages=94–97| doi-access=free }}
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