A deformation of Penner's simplicial coordinate

Abstract

We produce a one-parameter family of coordinates \h\h∈R of the decorated Teichm\"uller space of an ideally triangulated punctured surface (S,T) with negative Euler characteristic, which is a deformation of Penner's simplicial coordinate P1. If h≥slant0, the decorated Teichm\"uller space in the h coordinate becomes an explicit convex polytope P(T) independent of h, and if h<0, the decorated Teichm\"uller space becomes an explicit bounded convex polytope Ph(T) so that Ph(T)⊂ Ph'(T) if h<h'. As a consequence, Bowditch-Epstein and Penner's cell decomposition of the decorated Teichm\"uller space is reproduced.