Prescribing Gaussian curvature on closed Riemann surface with conical singularity in the negative case

Abstract

The problem of prescribing Gaussian curvature on Riemann surface with conical singularity is considered. Let (,β) be a closed Riemann surface with a divisor β, and Kλ=K+λ, where K:→R is a H\"older continuous function satisfying K= 0, K 0, and λ∈R. If the Euler characteristic (,β) is negative, then by a variational method, it is proved that there exists a constant λ>0 such that for any λ≤ 0, there is a unique conformal metric with the Gaussian curvature Kλ; for any λ, 0<λ<λ, there are at least two conformal metrics having Kλ its Gaussian curvature; for λ=λ, there is at least one conformal metric with the Gaussian curvature Kλ; for any λ>λ, there is no certain conformal metric having Kλ its Gaussian curvature. This result is an analog of that of Ding and Liu Ding-Liu, partly resembles that of Borer, Galimberti and Struwe B-G-Stru, and generalizes that of Troyanov Troyanov in the negative case.