Piecewise geodesic Jordan curves I: weldings, explicit computations, and Schwarzian derivatives

Abstract

We consider Jordan curves of the form γ=j=1n γj on the Riemann sphere for which each γj is a hyperbolic geodesic in ( C γ) γj. These Jordan curves are characterized by their conformal welding being piecewise M\"obius. We show that the Schwarzian derivatives of the uniformizing mappings of the two regions in C γ form a rational function with at most second-order poles at the endpoints of γj and that the poles are simple if the curve has continuous tangents. A key tool is the explicit computation of all C1 geodesic pairs, namely C1 chords γ=γ1γ2 in a simply connected domain D such that γj is a hyperbolic geodesic in D γ3-j for both j=1 and j=2.