Few remarks on the Poincar\'e metric on a singular holomorphic foliation

Abstract

Let F be a Riemann surface foliation on M E, where M is a complex manifold and E ⊂ M is a closed set. Assume that F is hyperbolic, i.e., all leaves of the foliation F are hyperbolic Riemann surface. Fix a hermitian metric g on M. We will consider the Verjovsky's modulus of uniformization map η, which measures the largest possible derivative in the class of holomorphic maps from the unit disk into the leaves of F. Various results are known to ensure the continuity of the map η along the transverse directions, with suitable conditions on M, F and E. For a domain U ⊂ M, let FU be the holomorphic foliation given by the restriction of F to the domain U, i.e., FU. We will consider the modulus of uniformization map ηU corresponding to the foliation FU, and study its variation when the corresponding domain U varies in the Caratheodory kernel sense, motivated by the work of Lins Neto--Martins.