Global existence and convergence of a flow to Kazdan-Warner equation with non-negative prescribed function

Abstract

We consider an evolution problem associated to the Kazdan-Warner equation on a closed Riemann surface (,g) align* -gu=8π(heu∫heu dμg-1∫ dμg) align* where the prescribed function h≥0 and h>0. We prove the global existence and convergence under additional assumptions such as align* g h(p0)+8π-2K(p0)>0 align* for any maximum point p0 of the sum of 2 h and the regular part of the Green function, where K is the Gaussian curvature of . In particular, this gives a new proof of the existence result by Yang and Zhu [Proc. Amer. Math. Soc. 145 (2017), no. 9, 3953-3959] which generalizes existence result of Ding, Jost, Li and Wang [Asian J. Math. 1 (1997), no. 2, 230-248] to the non-negative prescribed function case.