| Article ID | Journal | Published Year | Pages | File Type |
|---|---|---|---|---|
| 4606354 | Differential Geometry and its Applications | 2011 | 9 Pages |
Let (X,g)(X,g) be an Hadamard manifold with ideal boundary ∂X . We can then define the map φ:X→P(∂X)φ:X→P(∂X) associated with Poisson kernel on X , where P(∂X)P(∂X) is the space of probability measures on ∂X, together with the Fisher information metric G. We make geometrical investigation of homothetic property and minimality of this map with respect to the metrics g and G. The map φ is shown to be a minimal homothetic embedding for a rank one symmetric space of noncompact type as well as for a nonsymmetric Damek–Ricci space. The following is also obtained. If φ is assumed to be homothetic and minimal, then, (X,g)(X,g) turns out to be an asymptotically harmonic, visibility manifold with the Poisson kernel being expressed in terms of the Busemann function.
