The behaviour of solutions of the Gaussian curvature equation near an isolated boundary point

Abstract

A classical result of Nitsche Nit57 about the behaviour of the solutions to the Liouville equation u=4 e2u near isolated singularities is generalized to solutions of the Gaussian curvature equation u=- (z) e2u where is a negative H\"older continuous function. As an application a higher--order version of the Yau--Ahlfors--Schwarz lemma for complete conformal Riemannian metrics is obtained.