The limit sets of quasifuchsian punctured surface groups and the Teichmüller distances (Q2574394)

Let \(S\) be the interior of a compact surface with negative Euler characteristic. Bers' simultaneous uniformization theorem says that given two hyperbolic surfaces \(X\) and \(Y\) of finite area homeomorphic to \(S\) and a homeomorphism \(h: X\to Y\) there exists a unique quasifuchsian group \(G\) up to conjugation by Möbius transformations. The author gives an estimate for the Teichmüller distance between two marked surfaces \(X\) and \(Y\) in terms of the quasi-Fuchsian representation \(G\).