Poles of cubic differentials and ends of convex RP2-surfaces

Abstract

The affine sphere construction gives, on any oriented surface, a one-to-one correspondence between convex RP2-structures and holomorphic cubic differentials. Generalizing results of Benoist-Hulin, Loftin and Dumas-Wolf, we show that poles of order less than 3 of cubic differentials correspond to finite volume ends of convex RP2-structures, and poles of order 3 (resp. bigger than 3) correspond to geodesic (resp. piecewise geodesic) ends. In particular, at a pole of order at least 3, we bordify the surface by attaching to it a boundary circle in a natural way with respect to the cubic differential, and show that the RP2-structure extends to the boundary in a metric preserving way.