Derivatives of length functions and shearing coordinates on teichm\"uller spaces

Abstract

Let S be a closed oriented surface of genus at least 2, and denote by T(S) its Teichm\"uller space. For any isotopy class of closed curves γ, we compute the first three derivatives of the length function \γ:T(S)→R\+ in the shearing coordinates associated to a maximal geodesic lamination λ. We show that if γ intersects every leaf of λ, then the Hessian of \γ is positive-definite. We extend this result to length functions of measured laminations. We also provide a method to compute higher derivatives of length functions of geodesics. We use Bonahon's theory of transverse H\"older distributions and shearing coordinates.