Large Conformal metrics with prescribed sign-changing Gauss curvature

Abstract

Let (M,g) be a two dimensional compact Riemannian manifold of genus g(M)>1. Let f be a smooth function on M such that f 0, f 0, M f = 0. Let p1,…,pn be any set of points at which f(pi)=0 and D2f(pi) is non-singular. We prove that for all sufficiently small λ>0 there exists a family of "bubbling" conformal metrics gλ=euλg such that their Gauss curvature is given by the sign-changing function Kgλ=-f+λ2. Moreover, the family uλ satisfies uλ(pj) = -4λ -2 ( 12 1λ ) +O(1) and λ2euλ8πΣi=1nδpi, as λ 0, where δp designates Dirac mass at the point p.