Bubbling of the prescribed Q-curvature equation on 4-manifolds in the null case

Abstract

Analog to the classical result of Kazdan-Warner for the existence of solutions to the prescribed Gaussian curvature equation on compact 2-manifolds without boundary, it is widely known that if (M,g0) is a closed 4-manifold with zero Q-curvature and if f is any non-constant, smooth, sign-changing function with ∫M f dμ g0 <0, then there exists at least one solution u to the prescribed Q-curvature equation \[ Pg0 u = f e4u, \] where Pg0 is the Paneitz operator which is positive with kernel consisting of constant functions. In this paper, we fix a non-constant smooth function f0 with \[ x∈ Mf0(x)=0, ∫M f0 dμ g0 <0 \] and consider a family of prescribed Q-curvature equations \[ Pg0 u=(f0+λ)e4u, \] where λ>0 is a suitably small constant. A solution to the equation above can be obtained from a minimizer uλ of certain energy functional associated to the equation. Firstly, we prove that the minimizer uλ exhibits bubbling phenomenon in a certain limit regime as λ 0. Then, we show that the analogous phenomenon occurs in the context of Q-curvature flow.