2 research outputs found
Height estimates for Killing graphs
The paper aims at proving global height estimates for Killing graphs defined
over a complete manifold with nonempty boundary. To this end, we first point
out how the geometric analysis on a Killing graph is naturally related to a
weighted manifold structure, where the weight is defined in terms of the length
of the Killing vector field. According to this viewpoint, we introduce some
potential theory on weighted manifolds with boundary and we prove a weighted
volume estimate for intrinsic balls on the Killing graph. Finally, using these
tools, we provide the desired estimate for the weighted height in the
assumption that the Killing graph has constant weighted mean curvature and the
weighted geometry of the ambient space is suitably controlled.Comment: 26 pages. Final version. To appear on Journal of Geometric Analysi