报告人:周恒宇(重庆大学)
时间:2022年9月15日 14:00-15:00
地点:腾讯会议号:815 811 132,无需密码
In this paper we characterize the L^1 convergence of C^2 bounded functions such that their graphs have uniformly bounded mean curvature. As an application with Gerhardt's approximate process, we established the existence of closed or C^{3,alpha} compact prescribed mean curvature (PMC) hypersurfaces in conformally product manifolds with its mean curvature equal to a C^{1,alpha} function under a natural barrier condition. Moreover, these hypersurfaces are homeomorphic to the underlying n-dimensional Riemannian manifold for 2=<n=<7. In addition, if a quasi-decreasing condition of PMC functions is satisfied, such PMC hypersurfaces are C^1 graphs.
