Feix-Kaledin metric on the total spaces of cotangent bundles to K\"ahler quotients

Abstract

In this paper we study the geometry of the total space Y of a cotangent bundle to a K\"ahler manifold N where N is obtained as a K\"ahler reduction from Cn. Using the hyperk\"ahler reduction we construct a hyperk\"ahler metric on Y and prove that it coincides with the canonical Feix-Kaledin metric. This metric is in general non-complete. We show that the metric completion Y of the space Y is equipped with a structure of a stratified hyperk\"ahler space. We give a necessary condition for the Feix-Kaledin metric to be complete using an observation of R.Bielawski. Pick a complex structure J on Y induced from quaternions. Suppose that J I where I is the complex structure whose restriction to Y = T*N is induced by the complex structure on N. We prove that the space YJ admits an algebraic structure and is an affine variety.