Ahlfors finiteness theorem
In the mathematical theory of Kleinian groups, the Ahlfors finiteness theorem describes the quotient of the domain of discontinuity by a finitely generated Kleinian group. The theorem was proved by Lars Ahlfors,[1][2] apart from a gap that was filled by Greenberg.[3]
The Ahlfors finiteness theorem states that if Γ is a finitely-generated Kleinian group with region of discontinuity Ω, then Ω/Γ has a finite number of components, each of which is a compact Riemann surface with a finite number of points removed.
Bers area inequality
[edit | edit source]The Bers area inequality is a quantitative refinement of the Ahlfors finiteness theorem proved by Lipman Bers.[4] It states that if Γ is a non-elementary finitely-generated Kleinian group with N generators and with region of discontinuity Ω, then
- Area(Ω/Γ) ≤ 4π(N − 1)
with equality only for Schottky groups. (The area is given by the Poincaré metric in each component.) Moreover, if Ω1 is an invariant component then
- Area(Ω/Γ) ≤ 2Area(Ω1/Γ)
with equality only for Fuchsian groups of the first kind (so in particular there can be at most two invariant components).
References
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Further reading
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