Hermitian symmetric spaces of constant curvature have the property that the potential for their Kahler metric can be expresed as some function of the geodesic distance. Does anyone know if there are any general results concerning Kahler manifolds with this property?

Hermitian symmetric spaces of constant curvature have the property that the potential for their Kähler metric can be expresed as some function of the geodesic distance. Does anyone know if there are any general results concerning Kähler manifolds with this property?