Optimal geodesics for boundary points of the Gardiner-Masur compactification

Abstract

The Gardiner-Masur compactification of Teichm\"uller space is homeomorphic to the horofunction compactification of the Teichm\"uller metric. Let and η be a pair of boundary points in the Gardiner-Masur compactification that fill up the surface. We show that there is a unique Teichm\"uller geodesic which is optimal for the horofunctions corresponding to and η. In particular, when and η are Busemann points that fill up the surface, the geodesic converges to in forward direction and to η in backward direction. As an application, we show that if Gn is a sequence of Teichm\"uller geodesics passing through Xn and Yn such that Xn and Yn η, then Gn converges to a unique Teichm\"uller geodesic.