Geodesic discs in Teichmüller space (Q882951)

Let \(T(s)\) be the Teichmüller space of a Riemann surface \(S\). By definition, a geodesic disc in \(T(s)\) is the image of an isometric embedding of the Poincaré disc into \(T(s)\). It is shown in this paper that for any non-Strebel point \(\tau\in T(s)\), there are infinitely many geodesic discs containing [0] and \(\tau\).