The relative volume function and the capacity of sphere on asymptotically hyperbolic manifolds

Abstract

Following the work of Li-Shi-Qing, we propose the definition of the relative volume function for an AH manifold. It is not a constant function in general and we study the egularity of this function. We use this function to give an accurate characterization of the height of the geodesic defining function for the AH manifold with a given boundary metric. It is also proved that such functions are uniformly bounded from below at infinity and the bound only depends on the dimension. As an application, we use this function to research the capacity of balls in AH manifold and provide some limit results.

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