An invariant K\"ahler metric on the tangent disk bundle of a space-form

Abstract

We find a family of K\"ahler metrics invariantly defined on the radius r0>0 tangent disk bundle TM,r0 of any given real space-form M or any of its quotients by discrete groups of isometries. Such metrics are complete in the non-negative curvature case and non-complete in the negative curvature case. If M=2 and M has constant sectional curvature K≠0, then the K\"ahler manifolds TM,r0 have holonomy SU(2); hence they are Ricci-flat. For M=S2, just this dimension, the metric coincides with the Stenzel metric on the tangent manifold TS2, giving us a new most natural description of this well-know metric.