Einstein metrics from the Calabi ansatz via Derdzi\'nski duality

Abstract

Drawing on results of Derdzi\'nski's from the 80's, we classify conformally K\"ahler, U(2)-invariant, Einstein metrics on the total space of O(-m), for all m ∈ N. This yields infinitely many 1-parameter families of metrics exhibiting several different behaviours including asymptotically hyperbolic metrics (more specifically of Poincar\'e type), ALF metrics, and metrics which compactify to a Hirzebruch surface Hm with a cone singularity along the "divisor at infinity". This allows us to investigate transitions between behaviours yielding interesting results. For instance, we show that a Ricci--flat ALF metric known as the Taub-bolt metric can be obtained as the limit of a family of cone angle Einstein metrics on CP2 \# CP2 when the cone angle converges to zero. We also construct Einstein metrics which are asymptotically hyperbolic and conformal to a scalar-flat K\"ahler metric. Such metrics cannot be obtained by applying Derdzi\'nski's theorem.