Metrics with conical singularities on the sphere and sharp extensions of the theorems of Landau and Schottky

Abstract

An explicit formula for the generalized hyperbolic metric on the thrice--punctured sphere \z1, z2, z3\ with singularities of order αj 1 at zj is obtained in all possible cases α1+α2+α3 >2. The existence and uniqueness of such a metric was proved long time ago by Picard Pic1905 and Heins Hei62, while explicit formulas for the cases α1=α2=1 were given earlier by Agard AG and recently by Anderson, Sugawa, Vamanamurthy and Vuorinen A. We also establish precise and explicit lower bounds for the generalized hyperbolic metric. This extends work of Hempel Hem79 and Minda Min87b. As applications, sharp versions of Landau-- and Schottky--type theorems for meromorphic functions are obtained.