On the hyperbolic distance of n-times punctured spheres

Abstract

The length of the shortest closed geodesic in a hyperbolic surface X is called the systole of X. When X is an n-times punctured sphere C A where A ⊂ C is a finite set of cardinality n4, we define a quantity Q(A) in terms of cross ratios of quadruples in A so that Q(A) is quantitatively comparable with the systole of X. We next propose a method to construct a distance function dX on a punctured sphere X which is Lipschitz equivalent to the hyperbolic distance hX on X. In particular, when the construction is based on a modified quasihyperbolic metric, dX is Lipschitz equivalent to hX with Lipschitz constant depending only on Q(A).